HTML Microdata document

This HTML5 document contains 805 embedded RDF statements represented using HTML+Microdata notation.

The embedded RDF content will be recognized by any processor of HTML5 Microdata.

Namespace Prefixes

Prefix	IRI
dbpedia-cs	http://cs.dbpedia.org/resource/
freebase	http://rdf.freebase.com/ns/
n14	http://dbpedia.org/resource/File:
dbpedia-de	http://de.dbpedia.org/resource/
dbpedia-sv	http://sv.dbpedia.org/resource/
dbpedia-pl	http://pl.dbpedia.org/resource/
dbpedia-pt	http://pt.dbpedia.org/resource/
yago	http://dbpedia.org/class/yago/
n9	https://books.google.com/
dbpedia-ca	http://ca.dbpedia.org/resource/
dbpedia-id	http://id.dbpedia.org/resource/
xsdh	http://www.w3.org/2001/XMLSchema#
dbpedia-uk	http://uk.dbpedia.org/resource/
rdf	http://www.w3.org/1999/02/22-rdf-syntax-ns#
dbr	http://dbpedia.org/resource/
dbpedia-nl	http://nl.dbpedia.org/resource/
dbpedia-be	http://be.dbpedia.org/resource/
dbpedia-eo	http://eo.dbpedia.org/resource/
n18	https://onlinedegreemath.com/every-cyclic-group-is-abelian/
n20	https://web.archive.org/web/20130425163632/http:/www.cmi.univ-mrs.fr/~hamish/Papers/
n41	http://groupnames.org/
dbpedia-it	http://it.dbpedia.org/resource/
dbpedia-ar	http://ar.dbpedia.org/resource/
dbp	http://dbpedia.org/property/
dbpedia-fr	http://fr.dbpedia.org/resource/
dcterms	http://purl.org/dc/terms/
dbpedia-fa	http://fa.dbpedia.org/resource/
n16	https://books.google.com/books%3Fid=ehrUt21SnsoC&pg=PA18%7Cquotation='''Z'''%3Csub%3E''n''%3C/
gold	http://purl.org/linguistics/gold/
dbpedia-fi	http://fi.dbpedia.org/resource/
n52	http://members.tripod.com/~dogschool/
n21	http://www.jmilne.org/math/CourseNotes/
dbt	http://dbpedia.org/resource/Template:
dbpedia-zh	http://zh.dbpedia.org/resource/
owl	http://www.w3.org/2002/07/owl#
n43	https://global.dbpedia.org/id/
dbpedia-sr	http://sr.dbpedia.org/resource/
dbc	http://dbpedia.org/resource/Category:
dbpedia-he	http://he.dbpedia.org/resource/
n49	http://dbpedia.org/resource/Minimal_polynomial_of_2cos(2pi/
dbpedia-ko	http://ko.dbpedia.org/resource/
wikidata	http://www.wikidata.org/entity/
dbpedia-sh	http://sh.dbpedia.org/resource/
foaf	http://xmlns.com/foaf/0.1/
dbpedia-hu	http://hu.dbpedia.org/resource/
n5	http://commons.wikimedia.org/wiki/Special:FilePath/
dbpedia-ru	http://ru.dbpedia.org/resource/
dbpedia-es	http://es.dbpedia.org/resource/
dbpedia-vi	http://vi.dbpedia.org/resource/
yago-res	http://yago-knowledge.org/resource/
n19	http://ml.dbpedia.org/resource/
rdfs	http://www.w3.org/2000/01/rdf-schema#
dbpedia-no	http://no.dbpedia.org/resource/
prov	http://www.w3.org/ns/prov#
dbo	http://dbpedia.org/ontology/
dbpedia-ja	http://ja.dbpedia.org/resource/
n36	http://ta.dbpedia.org/resource/
n57	http://www.cmi.univ-mrs.fr/~hamish/Papers/
wikipedia-en	http://en.wikipedia.org/wiki/

Statements

Subject Item: dbr:Presentation_of_a_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prime_power
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Primitive_root_modulo_n
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prüfer_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Rook's_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Root_of_unity
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Schwarz's_list
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Elementary_abelian_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Elementary_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:End_(graph_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_abstract_algebra_topics
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_character_tables_for_chemically_important_3D_point_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_conjectures
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_finite_simple_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_finite_spherical_symmetry_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Monogenic_semigroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Multiplicative_order
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Megagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Metacyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Semigroup_with_two_elements
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:XTR
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Problems_in_Latin_squares
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prime_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Barratt–Priddy_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Basic_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_tetrahedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Bloch's_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Braid_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Davenport_constant
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Algebraic_K-theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Anomaly_(physics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Anyon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Archimedean_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Homotopy_groups_of_spheres
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hunter_Snevily
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hyperoctahedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Bertram_Huppert
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Betti_number
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Regular_dodecahedron
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Resolvent_cubic
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Rng_(algebra)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Character_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cubic_field
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cuntz_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cycle_graph_(algebra)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cycle_index
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_cover
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_module
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_number_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_sieving
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_symmetry_in_three_dimensions
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Unit_(ring_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Unital_(geometry)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:C4
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Virtually_cyclic
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Virtually_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Voltage_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:De_Rham_curve
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Decagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Decision_Linear_assumption
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Decisional_Diffie–Hellman_assumption
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:E7_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Index_of_a_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Infinity_Cube
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Integral_transform
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Inverse_Galois_problem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Iwasawa_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:J-homomorphism
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Lifting_property
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_group_theory_topics
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_irreducible_Tits_indices
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_planar_symmetry_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_problems_in_loop_theory_and_quasigroup_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Z-group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pauli_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Whitehead_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Schanuel's_conjecture
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Spherical_space_form_conjecture
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Proof_of_knowledge
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Stiefel–Whitney_class
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Trivial_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Witt_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:119_(number)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Complex_reflection_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Convolution
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Conway_polyhedron_notation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Coxeter_notation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Chevalley–Shephard–Todd_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Chief_series
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Essentially_unique
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Gaussian_rational
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Generalized_symmetric_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Generated_collection
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Generic_polynomial
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Geometric_group_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Necklace_(combinatorics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Octagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Omega_and_agemo_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Nonagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Subgroup_growth
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Symmetry_element
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Nichols_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Restricted_sumset
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Simple_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Quasidihedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prüfer_theorems
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pythagorean_tiling
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Quotient_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:SL2(R)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tarski_monster_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Circle_of_fifths
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Classifying_space
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Clausen_function
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Eisenstein_integer
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Ellis_L._Johnson
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:knownFor: dbr:Cyclic_group

Subject Item: dbr:Emmy_Noether
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Galois_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Generating_set_of_a_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Glossary_of_group_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Boundedly_generated_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Modular_arithmetic
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Modular_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Modular_multiplicative_inverse
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Monoid
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Music_and_mathematics
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Mutually_orthogonal_Latin_squares
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Conway_polynomial_(finite_fields)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Crystal_structure
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Crystal_system
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Crystallographic_point_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Milnor_K-theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Subgroups_of_cyclic_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Arithmetic_and_geometric_Frobenius
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Baumslag–Gersten_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Locally_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Lorentz_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Chiliagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Shor's_algorithm
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Simplex
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Snake_lemma
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Closure_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Closure_with_a_twist
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Complemented_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Composition_series
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Computational_Diffie–Hellman_assumption
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:ZMap_(software)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Franklin_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Frattini_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Frieze_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Frobenius_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Frucht's_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hall_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hendecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hopf_invariant
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Horton_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Icositetragon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Kernel_(algebra)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Kummer_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Normal_basis
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pairing
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pentagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pisano_period
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Poincaré_series_(modular_form)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Polycyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prime-factor_FFT_algorithm
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pólya_enumeration_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Symmetric_product_(topology)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Symmetrization
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Symmetry_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Mathieu_group_M23
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Maximal_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tridecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:500_(number)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:C2
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Additive_combinatorics
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Adian–Rabin_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cauchy's_theorem_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Center_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Torsion_conjecture
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Trigonometric_functions
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Two's_complement
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Weil_conjectures
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Divisor
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Galois_ring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cycle
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Hadamard_transform
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Heap_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Latin_square
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Lattice_of_subgroups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Locally_compact_abelian_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Minimal_counterexample
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: n49:n)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Representation_theory_of_finite_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Representation_theory_of_the_symmetric_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Semigroup_with_three_elements
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Subdirectly_irreducible_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Short_five_lemma
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:3D_rotation_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:4
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:65537-gon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Affine_symmetric_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Alternating_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:257-gon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:3D4
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:44_(number)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cycle_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclic_group
rdf:type: dbo:Band yago:WikicatFiniteGroups yago:Relation100031921 yago:Property113244109 yago:Possession100032613 yago:WikicatPropertiesOfGroups yago:Abstraction100002137 yago:Group100031264
rdfs:label: Groupe cyclique Cyclische groep Циклическая группа Cyklisk grupp Cyclic group Gruppo ciclico Grupo cíclico Grupo cíclico Cyklická grupa Grupa cykliczna Grup cíclic Zyklische Gruppe 循環群 زمرة دائرية 순환군 Cikla grupo Циклічна група 巡回群
rdfs:comment: Um grupo diz-se cíclico se for gerado por um único elemento. V matematice, konkrétně v teorii grup, se pojmem cyklická grupa označuje grupa, která může být generována operováním s jedním jediným prvkem. Tento prvek se nazývá generátor cyklické grupy. Cyklická grupa může mít více než jeden generátor. Například grupa všech celých čísel modulo 5 se sčítáním má čtyři generátory: 1, 2, 3 a 4. Geometrickým názorným příkladem cyklických grup jsou grupy zákrytových otočení pravidelných mnohoúhelníků (s operací skládání zobrazení). Např. u pětiúhelníku jsou generátorem otočení o 72°, 144°, 216° nebo 288°. Je izomorfní s grupou . Cyklisk grupp inom matematiken är en grupp som kan genereras av ett enskilt element, dvs att gruppen har ett element a (som kallas gruppens ) sådant att varje element i gruppen är en potens av a och ekivalent att ett element a i en grupp G genererar G exakt om den enda delgruppen i G som innehåller a även är G. Dalam teori grup, cabang dari aljabar abstrak, grup siklik atau grup monogen adalah grup yaitu oleh satu elemen. Artinya, ini adalah himpunan dari elemen dengan satu asosiatif operasi biner, dan itu berisi elemen g sedemikian rupa sehingga setiap elemen grup dapat diperoleh dengan berulang kali menerapkan operasi grup ke g atau kebalikannya. Setiap elemen dapat ditulis sebagai pangkat g dalam notasi perkalian, atau sebagai kelipatan g dalam notasi aditif. Elemen g ini disebut grup. En mathématiques et plus précisément en théorie des groupes, un groupe cyclique est un groupe qui est à la fois fini et monogène, c'est-à-dire qu'il existe un élément a du groupe tel que tout élément du groupe puisse s'exprimer sous forme d'un multiple de a (en notation additive, ou comme puissance en notation multiplicative) ; cet élément a est appelé générateur du groupe. Il n'existe, à isomorphisme près, pour tout entier n > 0, qu'un seul groupe cyclique d'ordre n : le groupe quotient ℤ/nℤ — également noté ℤn ou Cn — de ℤ par le sous-groupe des multiples de n. 在群論中，循環群（英文：cyclic group），是指能由單個元素所生成的群。有限循环群同构于整数同余加法群，无限循环群则同构于整数加法群。每個循環群都是阿贝尔群，亦即其運算是可交換的。在群论中，循环群的性质已经被研究的较为透彻，是更为复杂的代数研究中常用到的基础工具。群論における巡回群（じゅんかいぐん、英: cyclic group、英: monogenous group）とは、ただ一つの元で生成される群（単項生成群）のことである。ここで群が「ただ一つの元で生成される」というのは、その群の適当な元 g をとれば、その群のどの元も（群が乗法的に書かれている場合は）g の整数冪として（群が加法的に書かれている場合は g の整数倍として）表されるということであり、このような元 g はこの群の生成元（generator）あるいは原始元（primitive）と呼ばれる。 في نظرية الزمر، يُقال عن زمرة أنها دائرية (بالإنجليزية: Cyclic group)‏ أو زمرة دوّارة، من أجل تمييزها عن زمرة الدائرة، إذا كان من الممكن توليدها عن طريق عنصر وحيد، فإذا كانت الزمرة تحوي عنصراً a (ويسمى مولد الزمرة) وكانت العملية المعرفة عليها هي الجداء، فإن أي عنصر من هذه الزمرة يمكن كتابته قوةً للعنصر a، أما إذا كانت العملية المعرفة هي الجمع فإن جميع العناصر يجب أن تكون من مضاعفات العنصر a. In group theory, a branch of abstract algebra in pure mathematics, a cyclic group or monogenous group is a group, denoted Cn, that is generated by a single element. That is, it is a set of invertible elements with a single associative binary operation, and it contains an element g such that every other element of the group may be obtained by repeatedly applying the group operation to g or its inverse. Each element can be written as an integer power of g in multiplicative notation, or as an integer multiple of g in additive notation. This element g is called a generator of the group. Циклическая группа — группа , которая может быть порождена одним элементом a, то есть все её элементы являются степенями a (или, если использовать аддитивную терминологию, представимы в виде na, где n — целое число). Математическое обозначение: . Несмотря на своё название, группа не обязательно должна буквально представлять собой «цикл». Может случиться так, что все степени будут различными. Порождённая таким образом группа называется бесконечной циклической группой и изоморфна группе целых чисел по сложению Un grup és cíclic pot ser generat per algun element. Això vol dir que hi ha, almenys, un element g del grup, que es diu generador de manera que tots els elements del grup són de la forma n g (en notació additiva) o gn (en notació multiplicativa), per un cert nombre enter n. Naturalment, 0 = 0 g i g = 1 g (en notació additiva) o i (en notació multiplicativa). En grupa teorio, cikla grupo estas grupo kiu povas esti per sola ero, en senso ke la grupo havas eron a (nomitan kiel naskanto de la grupo) tia ke, ĉiu ero de la grupo estas povo de a. Tio estas, ke grupo G estas cikla se tie ekzistas ero a en G tia ke G = { an por ĉiu entjero n }. Ekzemple, se G = { e, g1, g2, g3, g4, g5 }, tiam G estas cikla. Kaj, G estas esence la sama kiel la grupo de { 0, 1, 2, 3, 4, 5 } por operacio aldono module 6. Tio estas ke 1 + 2 mod 6 = 3, 2 + 5 mod 6 = 1, 4 - 4 = 4 + 2 mod 6 = 0 kaj tiel plu. Unu povas trovi izomorfion per igo ke g = 1. Циклічна група — це група, яка може бути породжена одним із своїх елементів. Тобто всі елементи групи є степенями даного елемента (або, використовуючи термінологію адитивних груп, всі елементи групи рівні , де ). Формально, для мультиплікативних груп: для адитивних: 군론에서 순환군(循環群, 영어: cyclic group)은 한 원소로 생성될 수 있는 군이다. 즉, 순환군의 모든 원소는 어떤 고정된 원소의 거듭제곱이다. (군의 연산이 곱셈이 아닌 덧셈일 경우, 모든 원소는 고정 원소의 정수배이다.) In der Gruppentheorie ist eine zyklische Gruppe eine Gruppe, die von einem einzelnen Element erzeugt wird. Sie besteht nur aus Potenzen des Erzeugers : Eine Gruppe ist also zyklisch, wenn sie ein Element enthält, sodass jedes Element von eine Potenz von ist. Gleichbedeutend damit ist, dass es ein Element gibt, sodass selbst die einzige Untergruppe von ist, die enthält. In diesem Fall wird ein erzeugendes Element oder kurz ein Erzeuger von genannt. Grupa cykliczna – grupa generowana przez pojedynczy element nazywany jej generatorem (grupa cykliczna może mieć wiele generatorów, ale każdy z nich samodzielnie generuje tę grupę). Oznacza to, że poprzez cykliczne iterowanie (wielokrotne złożenie) działania grupowego na generatorze lub jego odwrotności można uzyskać dowolny element tej grupy; w notacji multiplikatywnej elementy są więc potęgami generatora, a w notacji addytywnej – jego wielokrotnościami. Grupę cykliczną daje się zatem przedstawić jako In de groepentheorie, een deelgebied van de wiskunde, is een cyclische groep een groep die kan worden voortgebracht door één enkel element, voortbrenger geheten. Dat houdt in dat bij een multiplicatieve schrijfwijze, elk element van de groep een macht is van de voortbrenger (als de notatie additief is, een veelvoud van de voortbrenger). En teoría de grupos, un grupo cíclico es aquel que puede ser generado por un solo elemento; es decir, hay un elemento a del grupo G (llamado "generador" de G), tal que todo elemento de G puede ser expresado como una potencia de a. Si la operación del grupo se denota aditivamente, se dirá que todo elemento de G se puede indicar como un múltiplo de a, para n entero. In matematica, più precisamente nella teoria dei gruppi, un gruppo ciclico è un gruppo che può essere generato da un unico elemento. Un tale gruppo è isomorfo al gruppo delle classi di resto modulo , oppure al gruppo dei numeri interi. Quindi i gruppi ciclici sono fra i più semplici, e sono completamente classificati.
foaf:depiction: n5:GroupDiagramMiniC16.svg n5:GroupDiagramMiniC17.svg n5:GroupDiagramMiniC14.svg n5:GroupDiagramMiniC15.svg n5:GroupDiagramMiniC2.svg n5:GroupDiagramMiniC20.svg n5:GroupDiagramMiniC18.svg n5:GroupDiagramMiniC19.svg n5:GroupDiagramMiniC23.svg n5:Paley13.svg n5:GroupDiagramMiniC24.svg n5:GroupDiagramMiniC21.svg n5:GroupDiagramMiniC22.svg n5:GroupDiagramMiniC1.svg n5:GroupDiagramMiniC12.svg n5:GroupDiagramMiniC13.svg n5:GroupDiagramMiniC10.svg n5:GroupDiagramMiniC11.svg n5:Frieze_group_1g.png n5:Frieze_hop.png n5:Frieze_example_p11g.png n5:Frieze_group_11.png n5:Frieze_step.png n5:Olavsrose.svg n5:GroupDiagramMiniC3.svg n5:GroupDiagramMiniC5.svg n5:GroupDiagramMiniC4.svg n5:GroupDiagramMiniC8.svg n5:GroupDiagramMiniC9.svg n5:GroupDiagramMiniC6.svg n5:GroupDiagramMiniC7.svg n5:Frieze_example_p1.png n5:The_armoured_triskelion_on_the_flag_of_the_Isle_of_Man.svg n5:Hubble2005-01-barred-spiral-galaxy-NGC1300.jpg n5:Flag_of_Hong_Kong.svg n5:Triangle.Scalene.svg n5:Cyclic_group.svg n5:Circular-cross-decorative-knot-12crossings.svg
dcterms:subject: dbc:Abelian_group_theory dbc:Properties_of_groups
dbo:wikiPageID: 52327
dbo:wikiPageRevisionID: 1115206831
dbo:wikiPageWikiLink: dbr:Associative dbr:Prüfer_group dbr:Field_extension dbr:Cycle_graph dbr:Polygon dbr:Orbifold_notation dbc:Abelian_group_theory n14:Triangle.Scalene.svg dbr:Scalene_triangle dbr:Prentice_Hall dbr:Commutative_property dbr:Duality_(order_theory) dbr:Subgroup dbr:Klein_group dbr:Integer dbr:Countable_set dbr:Abelian_group dbr:Localization_of_a_ring n14:GroupDiagramMiniC1.svg n14:GroupDiagramMiniC14.svg n14:GroupDiagramMiniC15.svg dbr:Fundamental_theorem_of_finitely_generated_abelian_groups n14:GroupDiagramMiniC16.svg n14:GroupDiagramMiniC17.svg n14:GroupDiagramMiniC10.svg n14:GroupDiagramMiniC11.svg n14:GroupDiagramMiniC12.svg n14:GroupDiagramMiniC13.svg n14:GroupDiagramMiniC21.svg n14:GroupDiagramMiniC22.svg n14:GroupDiagramMiniC23.svg n14:GroupDiagramMiniC24.svg n14:GroupDiagramMiniC18.svg n14:GroupDiagramMiniC19.svg n14:GroupDiagramMiniC2.svg n14:GroupDiagramMiniC20.svg dbr:Finitely_generated_abelian_group n14:GroupDiagramMiniC4.svg dbr:Abstract_algebra n14:GroupDiagramMiniC8.svg n14:GroupDiagramMiniC9.svg dbr:Finitely_generated_group dbr:Coset n14:GroupDiagramMiniC5.svg n14:GroupDiagramMiniC6.svg n14:GroupDiagramMiniC7.svg dbr:Isomorphic dbr:Uncountable_set dbr:P-adic_number dbr:American_Mathematical_Monthly dbr:Celtic_knot dbr:Classification_of_finite_simple_groups dbr:Distributive_lattice dbr:Locally_cyclic_group dbr:Sylow_subgroup dbr:Flag_of_Hong_Kong dbc:Properties_of_groups dbr:Polycyclic_group dbr:Graduate_Studies_in_Mathematics dbr:Greatest_common_divisor dbr:Finite_field n14:Circular-cross-decorative-knot-12crossings.svg n14:Paley13.svg dbr:Automorphism_group dbr:Generating_set_of_a_group n14:Hubble2005-01-barred-spiral-galaxy-NGC1300.jpg dbr:Normal_subgroup dbr:Ring_homomorphism dbr:Rotational_symmetry dbr:Circulant_graph dbr:Complex_number dbr:Nicolas_Bourbaki dbr:Direct_product_of_groups n14:Frieze_example_p1.png n14:Frieze_example_p11g.png dbr:Isomorphism n14:Frieze_group_11.png n14:Frieze_group_1g.png n14:Frieze_hop.png n14:Frieze_step.png dbr:Group_theory dbr:Coprime dbr:Primitive_root_modulo_n dbr:Cayley_graph dbr:Rotoreflection dbr:Finite_group dbr:Multigraph dbr:Euler's_totient_function dbr:Simple_group dbr:Kummer_theory dbr:Index_(group_theory) dbr:Modular_representation_theory dbr:Frobenius_endomorphism n14:Flag_of_Hong_Kong.svg n14:GroupDiagramMiniC3.svg dbr:Metacyclic_group dbr:Path_graph n14:Cyclic_group.svg dbr:Circular_graph dbr:Modular_arithmetic dbr:Bijection dbr:Galois_group dbr:Presentation_of_a_group dbr:Root_of_a_polynomial dbr:Direct_product dbr:Group_extension dbr:Vertex-transitive_graph dbr:Composite_number dbr:Representation_theory_of_finite_groups dbr:Prime_number dbr:End_(graph_theory) n14:The_armoured_triskelion_on_the_flag_of_the_Isle_of_Man.svg dbr:Countable dbr:Inverse_element dbr:Cycle_graph_(group) dbr:Circle_group dbr:Additive_group dbr:Character_theory dbr:Characteristic_(algebra) dbr:Primary_cyclic_group dbr:Divisibility dbr:Polynomial dbr:Dicyclic_group dbr:Number_theory dbr:Relatively_prime dbr:Set_(mathematics) dbr:Divisor dbr:Frieze_group dbr:Group_(mathematics) dbr:Multiplicative_group_of_integers_modulo_n dbr:Commutative_ring dbr:Prime_power dbr:Cyclic_module dbr:Cyclic_number_(group_theory) dbr:Cyclic_sieving dbr:Chinese_remainder_theorem dbr:Unit_fraction dbr:Euler_totient_function dbr:Loop_(graph_theory) dbr:Ring_(algebra) dbr:Point_groups_in_three_dimensions dbr:Circle dbr:Cyclic_extension dbr:Conjugacy_class dbr:Prime_ideal dbr:Lowest_common_denominator dbr:Cyclic_order dbr:Lagrange's_theorem_(group_theory) dbr:Cyclically_ordered_group dbr:Solvability_by_radicals dbr:Nilpotent_group dbr:Rational_number n14:Olavsrose.svg dbr:Flag_of_the_Isle_of_Man dbr:Hyperbolic_group dbr:Mathematics dbr:NGC_1300 dbr:Field_(mathematics) dbr:Lattice_of_subgroups dbr:Root_of_unity dbr:Unit_(ring_theory) dbr:Endomorphism_ring dbr:Order_(group_theory) dbr:Graph_automorphism dbr:Quotient_group dbr:Binary_operation
dbo:wikiPageExternalLink: n9:books%3Fid=-tIaXdII8egC&pg=PA1 n9:books%3Fid=deWkZWYbyHQC&pg=PA82%7Cpages=82%E2%80%9384%7Ccontribution=6.4 n16:sub%3E n18: n20:MSRInotes2004.pdf n9:books%3Fid=xlIfdGPM9t4C&pg=PA105 n21:gt.html n9:books%3Fid=wG-08Lv8E-0C&pg=PA34%7Cpages=34%E2%80%9336%7Cisbn=8173195692 n9:books%3Fid=V_k79sVPcqYC&pg=PA63 n9:books%3Fid=QKVY4mDivBEC&pg=PA401 n9:books%3Fid=M32GNlFkmHgC&pg=PA65%7Cat=Theorem 62, n41:%23%3Fcyclic n9:books%3Fid=CnH3mlOKpsMC&pg=PA84 n9:books%3Fid=6foucBXceC4C&pg=PA50 n9:books%3Fid=7x_MF83tTKQC&pg=PA47 n52:cyclic.html n57:MSRInotes2004.pdf
owl:sameAs: dbpedia-ja:巡回群 dbpedia-ar:زمرة_دائرية dbpedia-id:Grup_siklik n19:ചാക്രികഗ്രൂപ്പ് dbpedia-no:Syklisk_gruppe dbpedia-ca:Grup_cíclic dbpedia-sh:Ciklična_grupa dbpedia-sr:Циклична_група wikidata:Q245462 dbpedia-fa:گروه_دوری dbpedia-cs:Cyklická_grupa freebase:m.0138jp6r dbpedia-it:Gruppo_ciclico dbpedia-fi:Syklinen_ryhmä n36:சுழற்_குலம் dbpedia-nl:Cyclische_groep yago-res:Cyclic_group freebase:m.0drq5 dbpedia-be:Цыклічная_група dbpedia-pl:Grupa_cykliczna dbpedia-eo:Cikla_grupo n43:2Jw8D dbpedia-es:Grupo_cíclico dbpedia-ko:순환군 dbpedia-pt:Grupo_cíclico dbpedia-zh:循環群 dbpedia-de:Zyklische_Gruppe dbpedia-he:חבורה_ציקלית dbpedia-fr:Groupe_cyclique dbpedia-vi:Nhóm_cyclic dbpedia-hu:Ciklikus_csoport dbpedia-uk:Циклічна_група dbpedia-ru:Циклическая_группа dbpedia-sv:Cyklisk_grupp
dbp:wikiPageUsesTemplate: dbt:Anchor dbt:Further dbt:OEIS dbt:Rangle dbt:Mset dbt:Abs dbt:! dbt:Google_books dbt:Main dbt:Citation dbt:Langle dbt:Clear dbt:Reflist dbt:Refn dbt:Group_theory_sidebar dbt:MathWorld dbt:Short_description
dbo:thumbnail: n5:Cyclic_group.svg?width=300
dbp:title: Cyclic Group
dbp:urlname: CyclicGroup
dbo:abstract: Dalam teori grup, cabang dari aljabar abstrak, grup siklik atau grup monogen adalah grup yaitu oleh satu elemen. Artinya, ini adalah himpunan dari elemen dengan satu asosiatif operasi biner, dan itu berisi elemen g sedemikian rupa sehingga setiap elemen grup dapat diperoleh dengan berulang kali menerapkan operasi grup ke g atau kebalikannya. Setiap elemen dapat ditulis sebagai pangkat g dalam notasi perkalian, atau sebagai kelipatan g dalam notasi aditif. Elemen g ini disebut grup. Setiap grup siklik tak terbatas adalah pada grup aditif dari Z, bilangan bulat. Setiap grup siklik hingga n isomorfik ke grup aditif dari Z/nZ, bilangan bulat modulo n . Setiap grup siklik adalah grup abelian (artinya operasi grupnya adalah komutatif), dan setiap grup abelian adalah dari grup siklik. Setiap kelompok siklik dari urutan prime adalah yang tidak dapat dipecah menjadi kelompok-kelompok yang lebih kecil. Di klasifikasi grup sederhana hingga, salah satu dari tiga kelas tak hingga terdiri dari gugus siklik orde utama. Dengan demikian, grup siklik dari orde utama berada di antara blok-blok penyusun dari mana semua grup dapat dibangun. 在群論中，循環群（英文：cyclic group），是指能由單個元素所生成的群。有限循环群同构于整数同余加法群，无限循环群则同构于整数加法群。每個循環群都是阿贝尔群，亦即其運算是可交換的。在群论中，循环群的性质已经被研究的较为透彻，是更为复杂的代数研究中常用到的基础工具。 Циклічна група — це група, яка може бути породжена одним із своїх елементів. Тобто всі елементи групи є степенями даного елемента (або, використовуючи термінологію адитивних груп, всі елементи групи рівні , де ). Формально, для мультиплікативних груп: для адитивних: In de groepentheorie, een deelgebied van de wiskunde, is een cyclische groep een groep die kan worden voortgebracht door één enkel element, voortbrenger geheten. Dat houdt in dat bij een multiplicatieve schrijfwijze, elk element van de groep een macht is van de voortbrenger (als de notatie additief is, een veelvoud van de voortbrenger). 群論における巡回群（じゅんかいぐん、英: cyclic group、英: monogenous group）とは、ただ一つの元で生成される群（単項生成群）のことである。ここで群が「ただ一つの元で生成される」というのは、その群の適当な元 g をとれば、その群のどの元も（群が乗法的に書かれている場合は）g の整数冪として（群が加法的に書かれている場合は g の整数倍として）表されるということであり、このような元 g はこの群の生成元（generator）あるいは原始元（primitive）と呼ばれる。 In group theory, a branch of abstract algebra in pure mathematics, a cyclic group or monogenous group is a group, denoted Cn, that is generated by a single element. That is, it is a set of invertible elements with a single associative binary operation, and it contains an element g such that every other element of the group may be obtained by repeatedly applying the group operation to g or its inverse. Each element can be written as an integer power of g in multiplicative notation, or as an integer multiple of g in additive notation. This element g is called a generator of the group. Every infinite cyclic group is isomorphic to the additive group of Z, the integers. Every finite cyclic group of order n is isomorphic to the additive group of Z/nZ, the integers modulo n. Every cyclic group is an abelian group (meaning that its group operation is commutative), and every finitely generated abelian group is a direct product of cyclic groups. Every cyclic group of prime order is a simple group, which cannot be broken down into smaller groups. In the classification of finite simple groups, one of the three infinite classes consists of the cyclic groups of prime order. The cyclic groups of prime order are thus among the building blocks from which all groups can be built. V matematice, konkrétně v teorii grup, se pojmem cyklická grupa označuje grupa, která může být generována operováním s jedním jediným prvkem. Tento prvek se nazývá generátor cyklické grupy. Cyklická grupa může mít více než jeden generátor. Například grupa všech celých čísel modulo 5 se sčítáním má čtyři generátory: 1, 2, 3 a 4. Geometrickým názorným příkladem cyklických grup jsou grupy zákrytových otočení pravidelných mnohoúhelníků (s operací skládání zobrazení). Např. u pětiúhelníku jsou generátorem otočení o 72°, 144°, 216° nebo 288°. Je izomorfní s grupou . En teoría de grupos, un grupo cíclico es aquel que puede ser generado por un solo elemento; es decir, hay un elemento a del grupo G (llamado "generador" de G), tal que todo elemento de G puede ser expresado como una potencia de a. Si la operación del grupo se denota aditivamente, se dirá que todo elemento de G se puede indicar como un múltiplo de a, para n entero. En otras palabras, G es cíclico, con generador a, si G = { an | n ∈ Z }. Dado que un grupo generado por un elemento de G es, en sí mismo, un subgrupo de G, basta con demostrar que el único subgrupo de G que contiene a a es el mismo G para probar que éste es cíclico. Por ejemplo, G = { e, g1, g2, g3, g4, g5 } es cíclico. De hecho, G es esencialmente igual (esto es, isomorfo) al grupo { 0, 1, 2, 3, 4, 5 } bajo la operación de suma módulo 6. El isomorfismo se puede hallar fácilmente haciendo ga→ a. Contrariamente a lo que sugiere la palabra "cíclico", es posible generar infinitos elementos y no formar nunca un ciclo real: es decir, que cada gn sea distinto. Un grupo tal sería un grupo cíclico infinito, isomorfo al grupo Z de los enteros bajo la adición. Salvo isomorfismos, existe exactamente un grupo cíclico para cada cantidad finita de elementos, y exactamente un grupo cíclico infinito. Por lo anterior, los grupos cíclicos son de algún modo los más simples, y han sido completamente clasificados. Por esto, los grupos cíclicos normalmente se denotan simplemente por el grupo "canónico" al que son isomorfos: si el grupo es de orden n, para n entero, dicho grupo es el grupo Zn de enteros { 0, ..., n-1 } bajo la adición módulo n. Si es infinito, éste es, como cabe esperarse, Z. La notación Zn comúnmente es evitada por teoristas de los números, puesto que puede ser confundida con la notación usual para los números p-ádicos. Una alternativa es usar la notación de grupo cociente, Z/nZ; otra posible solución es denotar la operación multiplicativamente, y representar el grupo Cn = { e, a1, a2, ..., an-1 }. Empero, estas dos notaciones no son tan populares como Zn. In matematica, più precisamente nella teoria dei gruppi, un gruppo ciclico è un gruppo che può essere generato da un unico elemento. Un tale gruppo è isomorfo al gruppo delle classi di resto modulo , oppure al gruppo dei numeri interi. Quindi i gruppi ciclici sono fra i più semplici, e sono completamente classificati. En mathématiques et plus précisément en théorie des groupes, un groupe cyclique est un groupe qui est à la fois fini et monogène, c'est-à-dire qu'il existe un élément a du groupe tel que tout élément du groupe puisse s'exprimer sous forme d'un multiple de a (en notation additive, ou comme puissance en notation multiplicative) ; cet élément a est appelé générateur du groupe. Il n'existe, à isomorphisme près, pour tout entier n > 0, qu'un seul groupe cyclique d'ordre n : le groupe quotient ℤ/nℤ — également noté ℤn ou Cn — de ℤ par le sous-groupe des multiples de n. Les groupes cycliques sont importants en algèbre. On les retrouve, par exemple, en théorie des anneaux et en théorie de Galois. Cyklisk grupp inom matematiken är en grupp som kan genereras av ett enskilt element, dvs att gruppen har ett element a (som kallas gruppens ) sådant att varje element i gruppen är en potens av a och ekivalent att ett element a i en grupp G genererar G exakt om den enda delgruppen i G som innehåller a även är G. En grupa teorio, cikla grupo estas grupo kiu povas esti per sola ero, en senso ke la grupo havas eron a (nomitan kiel naskanto de la grupo) tia ke, ĉiu ero de la grupo estas povo de a. Tio estas, ke grupo G estas cikla se tie ekzistas ero a en G tia ke G = { an por ĉiu entjero n }. Ekzemple, se G = { e, g1, g2, g3, g4, g5 }, tiam G estas cikla. Kaj, G estas esence la sama kiel la grupo de { 0, 1, 2, 3, 4, 5 } por operacio aldono module 6. Tio estas ke 1 + 2 mod 6 = 3, 2 + 5 mod 6 = 1, 4 - 4 = 4 + 2 mod 6 = 0 kaj tiel plu. Unu povas trovi izomorfion per igo ke g = 1. Povas esti ebla generi malfinie multajn erojn kaj ne formi: tio estas ĉiu { }. Grupo generita en tiamaniere estas nomita kiel malfinia cikla grupo, kiu ankaŭ estas izomorfia al la adicia grupo de entjeroj Z. Pro izomorfio tie ekzistas akurate unu cikla grupo por ĉiu finia nombro de eroj, kaj unu malfinia cikla grupo. De ĉi tie, la ciklaj grupoj estas la plej simplaj grupoj kaj ili estas plene klasifikitaj. Um grupo diz-se cíclico se for gerado por um único elemento. في نظرية الزمر، يُقال عن زمرة أنها دائرية (بالإنجليزية: Cyclic group)‏ أو زمرة دوّارة، من أجل تمييزها عن زمرة الدائرة، إذا كان من الممكن توليدها عن طريق عنصر وحيد، فإذا كانت الزمرة تحوي عنصراً a (ويسمى مولد الزمرة) وكانت العملية المعرفة عليها هي الجداء، فإن أي عنصر من هذه الزمرة يمكن كتابته قوةً للعنصر a، أما إذا كانت العملية المعرفة هي الجمع فإن جميع العناصر يجب أن تكون من مضاعفات العنصر a. Grupa cykliczna – grupa generowana przez pojedynczy element nazywany jej generatorem (grupa cykliczna może mieć wiele generatorów, ale każdy z nich samodzielnie generuje tę grupę). Oznacza to, że poprzez cykliczne iterowanie (wielokrotne złożenie) działania grupowego na generatorze lub jego odwrotności można uzyskać dowolny element tej grupy; w notacji multiplikatywnej elementy są więc potęgami generatora, a w notacji addytywnej – jego wielokrotnościami. Grupę cykliczną daje się zatem przedstawić jako gdzie jest (pewnym wybranym) generatorem grupy W szczególności może się zdarzyć, iż będzie dla pewnego równe elementowi neutralnemu – w tym wypadku grupa zawiera skończenie wiele elementów; jeżeli taka sytuacja nie zachodzi, to grupa ma nieskończenie wiele (dokładnie: przeliczalnie wiele) elementów. Najmniejszą grupą cykliczną jest grupa trywialna zawierająca tylko jeden element; najmniejszą grupą niecykliczną jest grupa Kleina (nazywana również „czwórkową”) rzędu Grupy cykliczne należą do najprostszych i najlepiej poznanych grup: skończone i nieskończone grupy cykliczne mają tę samą strukturę co (odpowiednio) grupy addytywne dla (zob. arytmetyka modularna) oraz (zob. liczby całkowite). W szczególności stanowią one „budulec” niektórych rodzajów grup przemiennych, zob. klasyfikacje grup przemiennych o skończonej liczbie elementów oraz grup przemiennych o skończonej liczbie generatorów. Grupa multiplikatywna dowolnego ciała skończonego (tj. zbiór elementów odwracalnych, czyli niezerowych, z mnożeniem) jest grupą cykliczną; w szczególności grupa multiplikatywna pierścienia klas reszt modulo jest cykliczna dla dowolnej liczby pierwszej Ogólniej, jest cykliczna wtedy i tylko wtedy, gdy lub jest postaci lub dla nieparzystej liczby pierwszej i liczby naturalnej Z drugiej strony dowolna grupa rzędu będącego liczbą pierwszą jest cykliczna. 군론에서 순환군(循環群, 영어: cyclic group)은 한 원소로 생성될 수 있는 군이다. 즉, 순환군의 모든 원소는 어떤 고정된 원소의 거듭제곱이다. (군의 연산이 곱셈이 아닌 덧셈일 경우, 모든 원소는 고정 원소의 정수배이다.) Un grup és cíclic pot ser generat per algun element. Això vol dir que hi ha, almenys, un element g del grup, que es diu generador de manera que tots els elements del grup són de la forma n g (en notació additiva) o gn (en notació multiplicativa), per un cert nombre enter n. Naturalment, 0 = 0 g i g = 1 g (en notació additiva) o i (en notació multiplicativa). In der Gruppentheorie ist eine zyklische Gruppe eine Gruppe, die von einem einzelnen Element erzeugt wird. Sie besteht nur aus Potenzen des Erzeugers : Eine Gruppe ist also zyklisch, wenn sie ein Element enthält, sodass jedes Element von eine Potenz von ist. Gleichbedeutend damit ist, dass es ein Element gibt, sodass selbst die einzige Untergruppe von ist, die enthält. In diesem Fall wird ein erzeugendes Element oder kurz ein Erzeuger von genannt. Zyklische Gruppen sind die einfachsten Gruppen und können vollständig klassifiziert werden: Für jede natürliche Zahl (für diese Aussage betrachten wir 0 nicht als natürliche Zahl) gibt es eine zyklische Gruppe mit genau Elementen, und es gibt die unendliche zyklische Gruppe, die additive Gruppe der ganzen Zahlen . Jede andere zyklische Gruppe ist zu einer dieser Gruppen isomorph. Циклическая группа — группа , которая может быть порождена одним элементом a, то есть все её элементы являются степенями a (или, если использовать аддитивную терминологию, представимы в виде na, где n — целое число). Математическое обозначение: . Несмотря на своё название, группа не обязательно должна буквально представлять собой «цикл». Может случиться так, что все степени будут различными. Порождённая таким образом группа называется бесконечной циклической группой и изоморфна группе целых чисел по сложению
gold:hypernym: dbr:Group
prov:wasDerivedFrom: wikipedia-en:Cyclic_group?oldid=1115206831&ns=0
dbo:wikiPageLength: 35496
foaf:isPrimaryTopicOf: wikipedia-en:Cyclic_group

Subject Item: dbr:Cyclic_order
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cyclically_ordered_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:E6_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Euler's_totient_function
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Exotic_sphere
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Exponentiation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Field_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Field_with_one_element
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finite_field
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:FourQ
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fourier_transform
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Brauer_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Brauer_tree
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Brouwer_fixed-point_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Outer_automorphism_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Parseval's_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cayley_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cayley_table
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Central_product
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Central_series
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Charts_on_SO(3)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Chromatic_circle
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Diameter_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Dicyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Diffie–Hellman_key_exchange
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Discrete_logarithm
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fano_plane
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Floral_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fokker_periodicity_block
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fourier_transform_on_finite_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Glide_plane
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Glide_reflection
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Glossary_of_differential_geometry_and_topology
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Gorenstein_scheme
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Graded_ring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Gravitational_instanton
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:History_of_group_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Isometry_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Isomorphism
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Joy_Morris
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Knot_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Leinster_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Length_of_a_module
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_cycles
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Point_reflection
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pollard's_rho_algorithm_for_logarithms
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Primitive_element_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Rank_of_a_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Regular_map_(graph_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Regular_p-group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Regular_representation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_cohomology
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_homomorphism
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_structure_and_the_axiom_of_choice
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Heptadecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hexagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Italo_Jose_Dejter
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Baby-step_giant-step
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Baer_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Covering_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Covering_space
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Coxeter_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Cramer–Shoup_cryptosystem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tensor_product_of_modules
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tetrahedron
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pentadecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prime_number
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Todd–Coxeter_algorithm
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Zolotarev's_lemma
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tetradecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abelian_Lie_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abelian_extension
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abelian_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abelian_variety
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abel–Ruffini_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Absolute_presentation_of_a_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abstract_algebra
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Abstract_analytic_number_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Character_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Characteristic_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Katalin_Marton
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Keller's_conjecture
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Lagrange's_theorem_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_Golay_code
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_icosahedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_octahedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Binary_quadratic_form
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Blanuša_snarks
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Sylow_theorems
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Eilenberg–MacLane_space
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:ElGamal_encryption
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Herbrand_quotient
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hexadecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Higher_residuosity_problem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Higman–Sims_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Hoffman_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Holomorph_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Homology_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Homomorphic_signatures_for_network_coding
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Thin_group_(combinatorial_group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Thin_group_(finite_group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Whitehead_torsion
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Word_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Word_problem_for_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:ZN
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:ZP
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Modular_representation_theory
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Schur–Zassenhaus_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Monogenous
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Monogenous_group
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Diamond_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Digon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Dihedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Direct_product_of_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Dirichlet's_unit_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Discrete_Fourier_transform
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Discrete_logarithm_records
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Discriminant
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Artin–Schreier_curve
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Associated_bundle
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Automorphism_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Mapping_class_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Burnside_problem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Ping-pong_lemma
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Socle_(mathematics)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Special_unitary_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Split-complex_number
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Splitting_lemma
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Square-free_integer
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Circle_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Circulant_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Circulant_matrix
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Class_formation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Class_of_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Free-by-cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Free_product
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Grigorchuk_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Grothendieck_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_of_Lie_type
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_of_rational_points_on_the_unit_circle
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_representation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Group_ring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Icosagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Icosahedral_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Identical_particles
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Infinite_cyclic
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Infinite_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Inner_automorphism
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Integer
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Minimal_polynomial_(linear_algebra)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Occurrences_of_Grandi's_series
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:One-relator_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Orbifold
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Order_(group_theory)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Orthogonal_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Radical_extension
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Real_projective_space
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Semidirect_product
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Klein_four-group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Max_Noether's_theorem_on_curves
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:SO(8)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Simultaneous_Authentication_of_Equals
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Square
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Septic_equation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Solvable_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Vedic_square
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Verifiable_secret_sharing
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Nielsen–Schreier_theorem
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Steinberg_symbol
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:IEEE_802.11s
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:List_of_small_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Lyons_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Symmetric_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Real_plane_curve
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Octadecagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Octahedral_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tutte_graph
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Prosolvable_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Point_groups_in_three_dimensions
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Point_groups_in_two_dimensions
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Weil_pairing
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Rubik's_Cube_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tensor_product_and_hom_of_cyclic_groups
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Exact_sequence
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finite_extensions_of_local_fields
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finite_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finite_ring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finitely_generated_abelian_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finitely_generated_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fitting_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Fixed-point_subring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Schoenflies_notation
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Myriagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pure_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:R-symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Teichmüller_cocycle
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Torsion_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:XOR_swap_algorithm
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Stufe_(algebra)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tutte_12-cage
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Multiplicative_group_of_integers_modulo_n
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Primary_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Polyhedral_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Superelliptic_curve
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Zimmert_set
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Normal_p-complement
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Pairing-based_cryptography
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Tetrahedral_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Residue-class-wise_affine_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:SQ-universal_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Subdirect_product
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Supersolvable_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Unknot
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:PSL(2,7)
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:P-group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Reduced_residue_system
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Spherical_3-manifold
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Simple_module
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Representation_ring
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Rotational_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Toida's_conjecture
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Right_group
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Triacontagon
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Z2
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Z3
dbo:wikiPageWikiLink: dbr:Cyclic_group

Subject Item: dbr:Finite_cyclic_group
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Indicial_Calculus
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Indicial_calculus
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Infinite_cyclic_subgroup
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Cyclic_group_of_order_2
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: dbr:Cyclic_symmetry
dbo:wikiPageWikiLink: dbr:Cyclic_group
dbo:wikiPageRedirects: dbr:Cyclic_group

Subject Item: wikipedia-en:Cyclic_group
foaf:primaryTopic: dbr:Cyclic_group