HTML Microdata document

This HTML5 document contains 682 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-de	http://de.dbpedia.org/resource/
xsdh	http://www.w3.org/2001/XMLSchema#
dbpedia-el	http://el.dbpedia.org/resource/
dbo	http://dbpedia.org/ontology/
rdf	http://www.w3.org/1999/02/22-rdf-syntax-ns#
dbpedia-ko	http://ko.dbpedia.org/resource/
n66	http://dbpedia.org/resource/Inside_Man_(Star_Trek:
dbpedia-lb	http://lb.dbpedia.org/resource/
dbpedia-simple	http://simple.dbpedia.org/resource/
wikidata	http://www.wikidata.org/entity/
owl	http://www.w3.org/2002/07/owl#
dbpedia-sl	http://sl.dbpedia.org/resource/
dbpedia-it	http://it.dbpedia.org/resource/
n5	http://d-nb.info/gnd/
gold	http://purl.org/linguistics/gold/
n36	https://global.dbpedia.org/id/
n52	https://web.archive.org/web/20200316193343/https:/www.lexico.com/definition/
dbpedia-et	http://et.dbpedia.org/resource/
dbpedia-fr	http://fr.dbpedia.org/resource/
n48	http://uz.dbpedia.org/resource/
n24	http://dbpedia.org/resource/File:
n20	http://commons.wikimedia.org/wiki/Special:FilePath/
dbpedia-ro	http://ro.dbpedia.org/resource/
dbr	http://dbpedia.org/resource/
dbpedia-gl	http://gl.dbpedia.org/resource/
dbpedia-ga	http://ga.dbpedia.org/resource/
dbpedia-hu	http://hu.dbpedia.org/resource/
dbpedia-no	http://no.dbpedia.org/resource/
dbpedia-ca	http://ca.dbpedia.org/resource/
dbpedia-es	http://es.dbpedia.org/resource/
dbpedia-pt	http://pt.dbpedia.org/resource/
dbpedia-kk	http://kk.dbpedia.org/resource/
n44	http://lt.dbpedia.org/resource/
n55	http://www.cmsim.eu/papers_pdf/january_2012_papers/
n34	http://www.lexico.com/definition/
dbpedia-nn	http://nn.dbpedia.org/resource/
n43	http://cv.dbpedia.org/resource/
dbpedia-ru	http://ru.dbpedia.org/resource/
dbpedia-nl	http://nl.dbpedia.org/resource/
dbpedia-sh	http://sh.dbpedia.org/resource/
freebase	http://rdf.freebase.com/ns/
prov	http://www.w3.org/ns/prov#
dbpedia-ja	http://ja.dbpedia.org/resource/
dbpedia-ar	http://ar.dbpedia.org/resource/
dbp	http://dbpedia.org/property/
dbpedia-fa	http://fa.dbpedia.org/resource/
dbpedia-uk	http://uk.dbpedia.org/resource/
dbc	http://dbpedia.org/resource/Category:
n53	http://bn.dbpedia.org/resource/
dbpedia-vi	http://vi.dbpedia.org/resource/
dbt	http://dbpedia.org/resource/Template:
rdfs	http://www.w3.org/2000/01/rdf-schema#
dct	http://purl.org/dc/terms/
wikipedia-en	http://en.wikipedia.org/wiki/
dbpedia-id	http://id.dbpedia.org/resource/
dbpedia-sr	http://sr.dbpedia.org/resource/
foaf	http://xmlns.com/foaf/0.1/
dbpedia-cs	http://cs.dbpedia.org/resource/
dbpedia-eo	http://eo.dbpedia.org/resource/
n64	https://archive.org/details/
dbpedia-zh	http://zh.dbpedia.org/resource/
n14	http://www.map.mpim-bonn.mpg.de/
dbpedia-fi	http://fi.dbpedia.org/resource/
dbpedia-pl	http://pl.dbpedia.org/resource/
dbpedia-he	http://he.dbpedia.org/resource/
n22	http://dbpedia.org/resource/Wikt:
n18	http://hy.dbpedia.org/resource/

Statements

Subject Item: dbr:Calculus_of_variations
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Projective_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Pulkovo_Observatory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Queen_Elizabeth_Park,_British_Columbia
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Schwarzschild_metric
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Elastic_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_curves_topics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_differential_geometry_topics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_formulas_in_Riemannian_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Michael_Roberts_(mathematician)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Midpoint
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mabuchi_functional
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Projective_vector_field
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Opaque_set
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Prime_geodesic
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Barra_do_Garças
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Bayer_Insectarium
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Beltrami's_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Bimetric_gravity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Bo_Berndtsson
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Alignments_of_random_points
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Almgren–Pitts_min-max_theory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Anosov_diffeomorphism
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:ApNano
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Arc_length
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hopf–Rinow_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hughes_H-4_Hercules
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Jules_Tannery
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Bertrand–Diguet–Puiseux_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_coordinate_charts
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_public_art_in_Green_Park
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Reinforced_rubber
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Reshetnyak_gluing_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ricci_curvature
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Curvature_of_Riemannian_manifolds
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Curvature_of_Space_and_Time,_with_an_Introduction_to_Geometric_Analysis
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cut_locus_(Riemannian_manifold)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:University_of_Zulia
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Vladimir_Markovic
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:De_Sitter_universe
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Desborough_Cut
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Dyadic_transformation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Dynamical_billiards
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Earth's_rotation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Earthquake_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Index_of_physics_articles_(G)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Intrinsic_metric
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Introduction_to_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Jacobi_field
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_longest_tunnels
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Orbit
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Polyhedron
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Levenberg–Marquardt_algorithm
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Levi-Civita_parallelogramoid
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Liberman's_lemma
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lie_derivative
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_mathematical_topics_in_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Space-oblique_Mercator_projection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:World_line
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Convex_set
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Counterculture_of_the_1960s
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Crofton_formula
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Analytical_mechanics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ellis_wormhole
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gauss's_principle_of_least_constraint
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:General_Staff_Academy_(Russian_Empire)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Generator_(mathematics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_bicombing
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_circle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_convexity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_curvature
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_deviation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_polyhedron
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesics_as_Hamiltonian_flows
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesics_in_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesy
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodetic_airframe
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodetic_effect
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geographical_distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geography_of_Wyoming
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geometric_Folding_Algorithms
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Net_(polyhedron)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Normal_coordinates
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Unit_tangent_bundle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Zero-drag_satellite
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Rabouyt_D2
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Christoffel_symbols
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Closed_timelike_curve
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Coastline_paradox
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Alexandrov's_uniqueness_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Envelope_(mathematics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Equations_of_motion
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gauss's_lemma_(Riemannian_geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gauss–Bonnet_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:General_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Genplan_Institute_of_Moscow
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic
rdf:type: owl:Thing
rdfs:label: Geodäte Geodesic Geodetica Geodésica Geodésica جيوديسي Linia geodezyjna Geodèsica Geodezia linio Géodésique Geodeet (wiskunde) 测地线 Геодезическая Geodesik 測地線 Геодезична лінія Geodetika Geodasach Γεωδαισιακή 측지선
rdfs:comment: Στη διαφορική γεωμετρία, γεωδαισιακή είναι μια γενίκευση της έννοιας της «ευθείας γραμμής» σε «». Ο όρος «γεωδαισιακή» προέρχεται από τη γεωδαισία, την επιστήμη της μέτρησης του μεγέθους και του σχήματος της Γης. Στην αρχική έννοια, μια γεωδαισιακή ήταν η συντομότερη διαδρομή μεταξύ δύο σημείων στην επιφάνεια της Γης, δηλαδή, ένα τμήμα ενός μέγιστου κύκλου. Ο όρος έχει γενικευτεί για να περιλαμβάνει μετρήσεις σε πολύ περισσότερα γενικά μαθηματικά πεδία. Για παράδειγμα, στη θεωρία γραφημάτων, θα μπορούσε κανείς να εξετάσει μια γεωδαισιακή μεταξύ δύο /κόμβων ενός γραφήματος. 测地线（英语：Geodesic）又称大地线或短程线，数学上可视作直线在弯曲空间中的推广；在有度规定义存在之时，测地线可以定义为空间中两点的最短路径。测地线（英語：geodesic）的名字来自对于地球尺寸与形状的大地测量学（英語：geodesy）。 In de differentiaalmeetkunde is een geodeet in een gekromde ruimte, een kromme zodanig dat voor elk tweetal punten op de kromme die dicht genoeg bij elkaar liggen, de "lengte" van de kromme tussen die twee punten stationair is (relatief weinig verandert bij bepaalde kleinere veranderingen van de kromme). Voor een vlakke ruimte zijn de geodeten de lijnen. Linia geodezyjna (krótko nazywana geodezyjną) – krzywa w przestrzeni metrycznej (ściślej: w G-przestrzeni), stanowiąca najkrótszą drogę pomiędzy dwoma punktami dostatecznie bliskimi. W sposób równoważny linie geodezyjne definiuje się jako krzywe o zerowej . Dla przestrzeni euklidesowej geodezyjne są zwykłymi prostymi. 微分幾何学において測地線（そくちせん、英: geodesic）とは、曲面（より一般的にはリーマン多様体）上の曲線であって、その上の十分近い2つの離れた点が最短線で結ばれた曲線を言う。ユークリッド空間における直線の概念を、曲がった空間において一般化したものである。「測地線」という用語は、地球の大きさと形状を測定する学問である測地学に由来する。本来の意味では、測地線は地表の2点間の最短ルートであり、球体形状の地球の場合、大円の一部となる。測地線の中でその長さが最小のものは最短測地線という。リーマン空間において、ある曲線が曲面上の測地線となるための必要十分条件は、曲線の主法線と曲面の接平面の法線とが曲線に沿って常に一致することである。この概念は、数学的な空間にも拡張され、例えばグラフ理論ではグラフ上の2つの頂点 (vertex) や結節点 (node) 間の測地線が定義されている。一般相対性理論では、光は曲がった空間での測地線を進むという原理に基づいて構築されている。 La geodèsica en la geodèsia és la línia més curta que va d'un punt a un altre dins una superfície. Per una esfera, la geodèsica coincideix amb l'ortodròmia, és a dir una línia que segueix un cercle màxim. Segons la teoria de la relativitat general, les partícules viatgen seguint una geodèsica a través de l'espaitemps, i per tant la seva trajectòria depèn de la curvatura. Aquesta curvatura és determinada per la distribució de l'energia, i la massa, segons l'equació d'Einstein. En general la geodèsica pot ser definida per qualsevol . 측지선(測地線, geodesic) 또는 지름길이란 직선의 개념을 굽은 공간으로 일반화한 것이다. Num plano, a geodésica é a menor distância que une dois pontos tal que, para pequenas variações da forma da curva ,o seu comprimento é estacionário. A representação da geodésica em um plano representa a projeção de um círculo máximo sobre uma esfera. Assim, tanto na superfície de uma esfera quanto na superfície esférica deformada num plano, a reta é uma curva, já que a menor distância possível entre dois pontos somente poderá ser curvada, pois uma reta precisaria, necessariamente, permanecer sempre num plano para ser a menor distância entre pontos. Observe a figura: In geometry, a geodesic (/ˌdʒiː.əˈdɛsɪk, -oʊ-, -ˈdiːsɪk, -zɪk/) is a curve representing in some sense the shortest path (arc) between two points in a surface, or more generally in a Riemannian manifold. The term also has meaning in any differentiable manifold with a connection. It is a generalization of the notion of a "straight line". Geodesics are of particular importance in general relativity. Timelike geodesics in general relativity describe the motion of free falling test particles. En geometría, la línea geodésica se define como la línea de mínima longitud que une dos puntos en una superficie dada, y está contenida en esta superficie. El plano osculador de la geodésica es perpendicular en cualquier punto al plano tangente a la superficie. Las geodésicas de una superficie son las líneas "más rectas" posibles (con menor curvatura) fijado un punto y una dirección dada sobre dicha superficie. في الرياضيات، الخط الجيوديسي أو الخط المتقاصِر وخاصة في الهندسة التفاضلية هو تعميم للخط المستقيم ضمن الفضاءات المنحنية. ففي الهندسة الإقليدية فإن الخط المستقيم هو أقصر مسافة بين نقطتين، ولكن على سطح منحنٍ أو كروي فإن أقصر مسافة بين نقطتين هو الخط الجيوديسي المتقاصر أو في الهندسة الريمانية والفضاء المتري وفضاء مينكوفسكي بشرط الخضوع لمترية نظامية natural metric. يعتمد طول الخط المتقاصر على طبيعة الفضاء المنحني، فإذا كان الفضاء يراعي المترية النظامية فعندئذ يمكن تعريفه على أنه أقصر خط بين نقطتين على متعدد التفرع. Eine Geodäte (Pl. Geodäten), auch Geodätische, geodätische Linie oder geodätischer Weg genannt, ist die lokal kürzeste Verbindungskurve zweier Punkte. Geodäten sind Lösungen einer gewöhnlichen Differentialgleichung zweiter Ordnung, der Geodätengleichung. Leathnú choincheap na líne dírí don spás cuarach, ag seasamh don líne is giorra idir dhá phointe fhosaithe ar an dromchla cuarach. Is cásanna ar leith ansin an líne dhíreach ar phlána agus ciorcail mhóra ar sféar. I gcoibhneasacht ghinearálta, gluaiseann réada atá ag saorthitim ar feadh geodasaigh i spás-am cuarach. En diferenciala geometrio, geodezia linio estas linio, kiu estas laŭeble rekta sur glata sternaĵo. En la ĝenerala teorio de relativeco, punkta partiklo moviĝas laŭ geodezia kurbo, sub la efiko de gravito. Геодези́ческая (также геодезическая ли́ния) — кривая определённого типа, обобщение понятия «прямая» для искривлённых пространств. Конкретное определение геодезической линии зависит от типа пространства. Например, на двумерной поверхности, вложенной в евклидово трёхмерное пространство, геодезические линии — это линии, достаточно малые дуги которых являются на этой поверхности кратчайшими путями между их концами. На плоскости это будут прямые, на круговом цилиндре — винтовые линии, прямолинейные образующие и окружности, на сфере — дуги больших окружностей. V diferenciální geometrii je geodetika křivka představující v určitém smyslu nejkratší cestu mezi dvěma body na ploše nebo obecněji na Riemannovské varietě. Jde o zobecnění pojmu „přímka“ na obecnější prostory. Název "geodetika" pochází z geodézie, vědy o měření velikosti a tvaru Země. V původním smyslu byla geodetika nejkratší cestou mezi dvěma body na zemském povrchu. Na sférické Zemi je to výseč velké kružnice. Termín byl zobecněn, aby zahrnul výpočty v mnohem obecnějších matematických prostorech; například v teorii grafů se dá uvažovat geodetika mezi dvěma vrcholy/uzly grafu. En géométrie, une géodésique est la généralisation d'une ligne droite sur une surface. En particulier, le chemin le plus court ou un des plus courts chemins, s'il en existe plusieurs, entre deux points d'un espace pourvu d'une métrique est une géodésique. Si on change cette notion de distance, les géodésiques de l'espace peuvent prendre une allure très différente. Геодези́чна лі́нія — крива на гладкому многовиді, головна нормаль якої ортогональна до многовиду. Геодезична лінія є узагальненням поняття прямої на викривлені (неевклідові) простори: така лінія для двох близько розташованих точок буде найкоротшою. Зокрема геодезичними лініями будуть: У метричних просторах поняття геодезичної лінії узагальнюється поняттям квазігеодезичної лінії. In matematica, e più precisamente in geometria differenziale, una geodetica è la curva più breve che congiunge due punti di uno spazio. Lo spazio in questione può essere una superficie, una più generale varietà riemanniana, o un ancor più generale spazio metrico. Ad esempio, nel piano le geodetiche sono le linee rette, su una sfera sono gli archi di cerchio massimo. Il concetto di geodetica è intimamente correlato a quello di metrica riemanniana, che è connesso con il concetto di distanza. Dalam geometri diferensial, geodesik (/ˌdʒiːəˈdɛsɪk, ˌdʒiːoʊ-, -ˈdiː-, -zɪk/)) adalah generalisasi gagasan "" ke "ruang melengkung". Istilah "geodesik" berasal dari geodesi, ilmu mengukur ukuran dan bentuk Bumi; Dalam pengertian aslinya, geodesik adalah rute terpendek antara dua titik di Bumi, yaitu lingkaran besar. Istilah ini telah digeneralisasi untuk mencakup pengukuran di ruang matematis yang jauh lebih umum; sebagai contoh, dalam teori graf, seseorang dapat mempertimbangkan antara dua simpul/simpul dari sebuah .
rdfs:seeAlso: dbr:Gauss–Bonnet_theorem dbr:Geodesics dbr:General_relativity
foaf:depiction: n20:Insect_on_a_torus_tracing_out_a_non-trivial_geodesic.gif n20:Transpolar_geodesic_on_a_triaxial_ellipsoid_case_A.svg n20:Spherical_triangle.svg n20:End_of_universe.jpg
dct:subject: dbc:Differential_geometry dbc:Geodesic_(mathematics)
dbo:wikiPageID: 91096
dbo:wikiPageRevisionID: 1122492801
dbo:wikiPageWikiLink: dbr:Flow_(mathematics) dbr:Smooth_function dbr:Test_particles dbr:Vertex_(graph_theory) dbr:Unit_tangent_bundle dbr:Jacobi_field dbr:Lexico dbr:Group_action_(mathematics) dbr:Ordinary_differential_equation dbr:Torus dbr:Line_segment dbr:Geodesic_(general_relativity) dbr:Ehresmann_connection dbr:Planetary_orbit dbr:Mathematical_constant dbr:Great_circle dbr:Point_particle dbr:Picard–Lindelöf_theorem dbr:Tangent_bundle dbr:Open_interval dbr:Locally dbr:Pushforward_(differential) dbr:Finsler_manifold dbr:Infimum n22:geodesic n22:geodetic dbr:Pseudo-Riemannian_manifold n24:Spherical_triangle.svg dbr:Ellipsoidal_geodesic dbr:Energy_functional dbr:Canonical_one-form dbr:Action_(physics) dbr:Vector_field dbr:Cauchy–Schwarz_inequality dbr:Spray_(mathematics) dbr:Hamiltonian_mechanics dbr:Equation dbr:Satellite n24:Transpolar_geodesic_on_a_triaxial_ellipsoid_case_A.svg dbr:Arc_length dbr:Torsion_tensor dbr:Rectifiable_path dbr:Horizontal_bundle dbr:Sub-Riemannian_geometry dbr:Open_set dbr:Liouville's_theorem_(Hamiltonian) dbr:Motion_planning dbr:Total_space dbr:Differentiable_manifold dbr:Connection_(mathematics) dbr:Earth dbr:Local_coordinates dbr:Euler–Lagrange_equation dbr:Shortest_path_problem dbr:Calculus_of_variations dbr:Metric_space dbr:Summation_convention dbr:Geodesic_airframe dbc:Differential_geometry dbr:Graph_theory dbr:Double_tangent_bundle dbr:Metric_tensor dbr:Planetary_surface n24:Insect_on_a_torus_tracing_out_a_non-trivial_geodesic.gif dbr:Distance_(graph_theory) dbr:Second_variation dbr:Differential_geometry_of_surfaces dbr:Affine_connection dbr:Hamiltonian_flow dbr:Arc_(geometry) dbr:UV_mapping dbr:Geometry dbr:Earth_geodesics dbr:Acceleration_(differential_geometry) dbr:Levi-Civita_connection dbr:Critical_point_(mathematics) dbr:John_Wiley_&_Sons dbr:Geodesics_on_a_triaxial_ellipsoid dbr:Line_(mathematics) dbr:Lorentzian_manifold dbr:Closed_geodesic dbr:Eikonal_equation dbr:Elastic_band dbr:Hamilton_equation dbr:Distance dbr:Spherical_Earth dbr:Tangent_space dbr:Euclidean_geometry dbr:Free_particle dbr:Neighborhood_(mathematics) dbr:Spherical_triangle n24:End_of_universe.jpg dbr:Real_number_line dbr:Free_fall dbr:Sphere dbr:Cambridge_University_Press dbr:General_relativity dbr:Curve dbr:First_variation dbr:Brachistochrone dbr:Skew-symmetric_matrix dbr:Spacetime dbr:Springer-Verlag dbr:McGraw-Hill dbr:Vertical_bundle dbr:Length_metric_space dbr:Projective_connection dbr:Riemannian_metric dbr:Exponential_map_(Riemannian_geometry) dbr:Oxford_University_Press dbr:Great-circle_distance dbr:Riemannian_geometry dbr:Riemannian_manifold dbr:Antipodal_point dbr:Graph_(discrete_mathematics) dbr:Classical_mechanics dbr:Metric_geometry dbr:Geodesic_circle dbr:Geodesic_curvature dbc:Geodesic_(mathematics) dbr:Geodesics_as_Hamiltonian_flows dbr:Geodesics_in_general_relativity dbr:Geodesy dbr:Geodesic_manifold dbr:Christoffel_symbol dbr:Geodesics_on_an_ellipsoid dbr:Geodesic_domes dbr:Molecular_dynamics dbr:Geodetic_airframe dbr:Christoffel_symbols dbr:Parallel_transport
dbo:wikiPageExternalLink: n14:Totally_geodesic_submanifold n34:geodesic n52:geodesic n55:25_CMSIM_2012_Pokorny_1_281-298.pdf n64:gravitationcosmo00stev_0
owl:sameAs: n5:4156669-5 dbpedia-nn:Geodetisk_kurve dbpedia-eo:Geodezia_linio dbpedia-sl:Geodetka dbpedia-ro:Geodezică dbpedia-ar:جيوديسي dbpedia-ru:Геодезическая dbpedia-no:Geodetisk_kurve dbpedia-lb:Geodetesch_Linn n18:Գեոդեզիկ_գծեր dbpedia-vi:Đường_trắc_địa dbpedia-ko:측지선 dbpedia-kk:Геодезиялық_сызықтар dbpedia-sr:Геодезијска_линија dbpedia-hu:Geodetikus_vonalak dbpedia-fr:Géodésique dbpedia-et:Geodeetiline_joon dbpedia-nl:Geodeet_(wiskunde) dbpedia-ja:測地線 dbpedia-simple:Geodesic n36:22XxY dbpedia-it:Geodetica dbpedia-pt:Geodésica dbpedia-sh:Geodezijska_linija dbpedia-ga:Geodasach n43:Геодезилле_йĕр n44:Geodezinė_kreivė dbpedia-pl:Linia_geodezyjna dbpedia-ca:Geodèsica dbpedia-uk:Геодезична_лінія n48:Geodezik_chiziq freebase:m.0mm26 dbpedia-cs:Geodetika dbpedia-de:Geodäte n53:ভূমিতিক_বক্ররেখা dbpedia-gl:Xeodésica dbpedia-es:Geodésica dbpedia-zh:测地线 dbpedia-fa:ژئودزیک wikidata:Q213488 dbpedia-el:Γεωδαισιακή dbpedia-he:מסילה_גאודזית dbpedia-fi:Geodeesi dbpedia-id:Geodesik
dbp:wikiPageUsesTemplate: dbt:Manifolds dbt:Citation_needed dbt:Citation dbt:Citation_style dbt:Expand_section dbt:EquationRef dbt:Commons_category dbt:Wikiquote dbt:Short_description dbt:See_also dbt:Tensors dbt:IPAc-en dbt:Cite_dictionary dbt:Authority_control dbt:Riemannian_geometry dbt:Multiple_image dbt:Harv dbt:Reflist dbt:Refn dbt:Further dbt:More_footnotes dbt:Springer dbt:Efn dbt:Annotated_link dbt:Mvar dbt:Cite_Merriam-Webster dbt:Anchor dbt:EquationNote dbt:Div_col dbt:Div_col_end dbt:Notelist dbt:About dbt:NumBlk
dbo:thumbnail: n20:Transpolar_geodesic_on_a_triaxial_ellipsoid_case_A.svg?width=300
dbp:caption: The Ribbon Test The curved line drawn using the ribbon test is a straight line on a flat surface. This is because a cone can be made into a 2-d circular sector.
dbp:first: Yu.A.
dbp:id: G/g044120
dbp:last: Volkov
dbp:title: Geodesic line
dbo:abstract: Leathnú choincheap na líne dírí don spás cuarach, ag seasamh don líne is giorra idir dhá phointe fhosaithe ar an dromchla cuarach. Is cásanna ar leith ansin an líne dhíreach ar phlána agus ciorcail mhóra ar sféar. I gcoibhneasacht ghinearálta, gluaiseann réada atá ag saorthitim ar feadh geodasaigh i spás-am cuarach. Eine Geodäte (Pl. Geodäten), auch Geodätische, geodätische Linie oder geodätischer Weg genannt, ist die lokal kürzeste Verbindungskurve zweier Punkte. Geodäten sind Lösungen einer gewöhnlichen Differentialgleichung zweiter Ordnung, der Geodätengleichung. Num plano, a geodésica é a menor distância que une dois pontos tal que, para pequenas variações da forma da curva ,o seu comprimento é estacionário. A representação da geodésica em um plano representa a projeção de um círculo máximo sobre uma esfera. Assim, tanto na superfície de uma esfera quanto na superfície esférica deformada num plano, a reta é uma curva, já que a menor distância possível entre dois pontos somente poderá ser curvada, pois uma reta precisaria, necessariamente, permanecer sempre num plano para ser a menor distância entre pontos. Do ponto de vista prático, na maioria dos casos, a geodésica é a curva de menor comprimento que une dois pontos. Em uma "geometria plana" (espaço euclidiano), essa curva é um segmento de reta, mas em "geometrias curvas" (geometria riemanniana), muito utilizadas por exemplo na Teoria da Relatividade Geral, a curva de menor distância entre dois pontos pode não ser uma reta. Para entender isso, peguemos como exemplo a curvatura do globo terrestre e seus continentes. Se traçarmos uma linha ligando duas capitais de continentes distintos, perceberemos que a linha não é reta, ela é um arco do círculo máximo; entretanto, se a distância entre as duas cidades for pequena, a linha que cobre o segmento do arco de círculo máximo será realmente uma reta. Todo mundo aprende na escola que a menor distância entre dois pontos é uma reta. Mas pouca gente se recorda – e alguns professores se esquecem de avisar – de que isso é válido apenas em um espaço plano. Em um espaço tridimensional, a coisa muda de figura. Imaginemos, por exemplo, um triângulo equilátero, aquele em que todos os lados são iguais, e todos os ângulos internos somam 180 graus. Marcando dois pontos dentro do triângulo, a menor distância entre eles sempre será uma reta. Além disso, não importa o tamanho dos lados; sempre, em qualquer circunstância, a soma dos ângulos internos do triângulo será 180 graus. Pois bem. Vamos mudar agora o paradigma. Imaginemos um espaço tridimensional: aquele em que nós vivemos todos os dias. Além das duas dimensões existentes no plano bidimensional (altura e comprimento), há uma outra, a profundidade. Nesse tipo de plano, a menor distância entre dois pontos é uma curva, mais especificamente um arco de círculo máximo. E – o que parece mais bizarro – a soma dos ângulos internos de um triângulo não é 180, mas 270 graus. Observe a figura: Repare que o triângulo formado entre os pontos A-B-C possui três ângulos retos (90 graus). Portanto, 270 graus. Esta representação pode ser confirmada na nossa realidade se pensarmos no planeta Terra. Suponha que a base de nosso triângulo seja formada pelo arco resultante da metade da linha do Equador. Com qualquer meridiano, o ângulo formado com o Equador será de 90 graus. Seguindo-se um meridiano qualquer até o Polo Norte e, de lá, seguindo-se outro meridiano até o Equador, teremos mais dois ângulos retos. Esse efeito tem implicações interessantes; por exemplo, quando você voa num avião, a trajetória que ele faz para ir de um destino a outro não segue uma “linha reta”, como muita gente imagina. Ele segue a “curvatura” da Terra, fazendo pequenos ajustes no sentido da viagem, a fim de percorrer o menor trecho possível. Se o avião fosse simplesmente “em linha reta”, acabaria por percorrer uma trajetória maior do que faz ao seguir a curvatura terrestre. Uma imagem pode, por exemplo, demonstrar como uma viagem entre Nova Iorque e Lisboa é feita, seguindo-se a menor distância entre dois pontos em um espaço tridimensional. Dalam geometri diferensial, geodesik (/ˌdʒiːəˈdɛsɪk, ˌdʒiːoʊ-, -ˈdiː-, -zɪk/)) adalah generalisasi gagasan "" ke "ruang melengkung". Istilah "geodesik" berasal dari geodesi, ilmu mengukur ukuran dan bentuk Bumi; Dalam pengertian aslinya, geodesik adalah rute terpendek antara dua titik di Bumi, yaitu lingkaran besar. Istilah ini telah digeneralisasi untuk mencakup pengukuran di ruang matematis yang jauh lebih umum; sebagai contoh, dalam teori graf, seseorang dapat mempertimbangkan antara dua simpul/simpul dari sebuah . 测地线（英语：Geodesic）又称大地线或短程线，数学上可视作直线在弯曲空间中的推广；在有度规定义存在之时，测地线可以定义为空间中两点的最短路径。测地线（英語：geodesic）的名字来自对于地球尺寸与形状的大地测量学（英語：geodesy）。 En diferenciala geometrio, geodezia linio estas linio, kiu estas laŭeble rekta sur glata sternaĵo. En la ĝenerala teorio de relativeco, punkta partiklo moviĝas laŭ geodezia kurbo, sub la efiko de gravito. Στη διαφορική γεωμετρία, γεωδαισιακή είναι μια γενίκευση της έννοιας της «ευθείας γραμμής» σε «». Ο όρος «γεωδαισιακή» προέρχεται από τη γεωδαισία, την επιστήμη της μέτρησης του μεγέθους και του σχήματος της Γης. Στην αρχική έννοια, μια γεωδαισιακή ήταν η συντομότερη διαδρομή μεταξύ δύο σημείων στην επιφάνεια της Γης, δηλαδή, ένα τμήμα ενός μέγιστου κύκλου. Ο όρος έχει γενικευτεί για να περιλαμβάνει μετρήσεις σε πολύ περισσότερα γενικά μαθηματικά πεδία. Για παράδειγμα, στη θεωρία γραφημάτων, θα μπορούσε κανείς να εξετάσει μια γεωδαισιακή μεταξύ δύο /κόμβων ενός γραφήματος. Στην παρουσία ενός αφινικού συνδέσμου, μια γεωδαισιακή ορίζεται να είναι μια καμπύλη της οποίας τα παραμένουν παράλληλα εάν κατά μήκος της. Αν αυτός ο σύνδεσμος είναι ο που προκαλείται από μια μετρική κατά Ρίμαν, τότε οι γεωδαισιακές είναι (τοπικά) η συντομότερη διαδρομή μεταξύ των σημείων στο χώρο. Οι γεωδαισιακές έχουν ιδιαίτερη σημασία για τη γενική σχετικότητα. Οι χρονοειδείς γεωδαισιακές στη γενική θεωρία της σχετικότητας περιγράφουν την κίνηση της ελεύθερης πτώσης των σημειακών σωματιδίων. En geometría, la línea geodésica se define como la línea de mínima longitud que une dos puntos en una superficie dada, y está contenida en esta superficie. El plano osculador de la geodésica es perpendicular en cualquier punto al plano tangente a la superficie. Las geodésicas de una superficie son las líneas "más rectas" posibles (con menor curvatura) fijado un punto y una dirección dada sobre dicha superficie. Más generalmente, se puede hablar de geodésicas en "espacios curvados" de dimensión superior llamados variedades riemannianas en donde, si el espacio contiene una métrica natural, entonces las geodésicas son (localmente) la distancia más corta entre dos puntos en el espacio. Un ejemplo físico, de variedad semirriemanniana es el que aparece en la teoría de la relatividad general, que establece que las partículas materiales se mueven a lo largo de geodésicas temporales del espacio-tiempo curvo. El término "geodésico" proviene de la palabra geodesia, la ciencia de medir el tamaño y forma del planeta Tierra; en el sentido original, fue la ruta más corta entre dos puntos sobre la superficie de la Tierra, específicamente, el segmento de un círculo máximo. In matematica, e più precisamente in geometria differenziale, una geodetica è la curva più breve che congiunge due punti di uno spazio. Lo spazio in questione può essere una superficie, una più generale varietà riemanniana, o un ancor più generale spazio metrico. Ad esempio, nel piano le geodetiche sono le linee rette, su una sfera sono gli archi di cerchio massimo. Il concetto di geodetica è intimamente correlato a quello di metrica riemanniana, che è connesso con il concetto di distanza. In matematica, le geodetiche hanno un ruolo fondamentale nello studio delle superfici (ad esempio, quella terrestre), e delle varietà astratte aventi dimensione 3 o maggiore. Sono importanti per descrivere alcune geometrie non euclidee, come la geometria iperbolica. In fisica, le geodetiche ricoprono un ruolo importante nello studio dei moti dei corpi in presenza di campi gravitazionali, dal momento che la relatività generale interpreta la forza gravitazionale come una deformazione dello spazio-tempo quadridimensionale. En géométrie, une géodésique est la généralisation d'une ligne droite sur une surface. En particulier, le chemin le plus court ou un des plus courts chemins, s'il en existe plusieurs, entre deux points d'un espace pourvu d'une métrique est une géodésique. Si on change cette notion de distance, les géodésiques de l'espace peuvent prendre une allure très différente. In geometry, a geodesic (/ˌdʒiː.əˈdɛsɪk, -oʊ-, -ˈdiːsɪk, -zɪk/) is a curve representing in some sense the shortest path (arc) between two points in a surface, or more generally in a Riemannian manifold. The term also has meaning in any differentiable manifold with a connection. It is a generalization of the notion of a "straight line". The noun geodesic and the adjective geodetic come from geodesy, the science of measuring the size and shape of Earth, though many of the underlying principles can be applied to any ellipsoidal geometry. In the original sense, a geodesic was the shortest route between two points on the Earth's surface. For a spherical Earth, it is a segment of a great circle (see also great-circle distance). The term has since been generalized to more abstract mathematical spaces; for example, in graph theory, one might consider a geodesic between two vertices/nodes of a graph. In a Riemannian manifold or submanifold, geodesics are characterised by the property of having vanishing geodesic curvature. More generally, in the presence of an affine connection, a geodesic is defined to be a curve whose tangent vectors remain parallel if they are transported along it. Applying this to the Levi-Civita connection of a Riemannian metric recovers the previous notion. Geodesics are of particular importance in general relativity. Timelike geodesics in general relativity describe the motion of free falling test particles. في الرياضيات، الخط الجيوديسي أو الخط المتقاصِر وخاصة في الهندسة التفاضلية هو تعميم للخط المستقيم ضمن الفضاءات المنحنية. ففي الهندسة الإقليدية فإن الخط المستقيم هو أقصر مسافة بين نقطتين، ولكن على سطح منحنٍ أو كروي فإن أقصر مسافة بين نقطتين هو الخط الجيوديسي المتقاصر أو في الهندسة الريمانية والفضاء المتري وفضاء مينكوفسكي بشرط الخضوع لمترية نظامية natural metric. يعتمد طول الخط المتقاصر على طبيعة الفضاء المنحني، فإذا كان الفضاء يراعي المترية النظامية فعندئذ يمكن تعريفه على أنه أقصر خط بين نقطتين على متعدد التفرع. أشهر مثال على استخدام الخطوط المتقاصرة هو في الطيران، إذ نظرًا لكروية الأرض فإنَّ المسافة الأقصر للطيران بين نقطتين تكون وفق الخط المتقاصر. كما وللخطوط المتقاصرة استخدامات أخرى في علم الفلك وتسيير الرحلات الفضائية. In de differentiaalmeetkunde is een geodeet in een gekromde ruimte, een kromme zodanig dat voor elk tweetal punten op de kromme die dicht genoeg bij elkaar liggen, de "lengte" van de kromme tussen die twee punten stationair is (relatief weinig verandert bij bepaalde kleinere veranderingen van de kromme). Voor een vlakke ruimte zijn de geodeten de lijnen. V diferenciální geometrii je geodetika křivka představující v určitém smyslu nejkratší cestu mezi dvěma body na ploše nebo obecněji na Riemannovské varietě. Jde o zobecnění pojmu „přímka“ na obecnější prostory. Název "geodetika" pochází z geodézie, vědy o měření velikosti a tvaru Země. V původním smyslu byla geodetika nejkratší cestou mezi dvěma body na zemském povrchu. Na sférické Zemi je to výseč velké kružnice. Termín byl zobecněn, aby zahrnul výpočty v mnohem obecnějších matematických prostorech; například v teorii grafů se dá uvažovat geodetika mezi dvěma vrcholy/uzly grafu. V Riemannianovské varietě nebo subvarietě se geodetiky vyznačují vlastností nulového geodetického zakřivení. Obecněji, za přítomnosti afinní konexe je geodetika definována jako křivka, jejíž tečné vektory zůstanou paralelní při přenosu podél ní. Pokud toto aplikujeme na Levi-Civitovu konexi Riemannovské metriky, dostaneme původní podmínku. Geodetiky mají zvláštní význam v obecné teorii relativity. Časupodobné geodetiky popisují pohyb volně padajících testovacích částic. 微分幾何学において測地線（そくちせん、英: geodesic）とは、曲面（より一般的にはリーマン多様体）上の曲線であって、その上の十分近い2つの離れた点が最短線で結ばれた曲線を言う。ユークリッド空間における直線の概念を、曲がった空間において一般化したものである。「測地線」という用語は、地球の大きさと形状を測定する学問である測地学に由来する。本来の意味では、測地線は地表の2点間の最短ルートであり、球体形状の地球の場合、大円の一部となる。測地線の中でその長さが最小のものは最短測地線という。リーマン空間において、ある曲線が曲面上の測地線となるための必要十分条件は、曲線の主法線と曲面の接平面の法線とが曲線に沿って常に一致することである。この概念は、数学的な空間にも拡張され、例えばグラフ理論ではグラフ上の2つの頂点 (vertex) や結節点 (node) 間の測地線が定義されている。一般相対性理論では、光は曲がった空間での測地線を進むという原理に基づいて構築されている。 Геодези́чна лі́нія — крива на гладкому многовиді, головна нормаль якої ортогональна до многовиду. Геодезична лінія є узагальненням поняття прямої на викривлені (неевклідові) простори: така лінія для двох близько розташованих точок буде найкоротшою. Зокрема геодезичними лініями будуть: * на площині — пряма; * на сфері — велике коло; * на сфероїді — крива двоякої кривини. При невеликій відстані (десятки кілометрів) мало відрізняється від відповідного нормального перетину, який є еліпсом[джерело?]. * у просторі Мінковського, характеристики якого в загальній теорії відносності визначено розподілом і рухом матерії геодезичною є світова лінія вільної матеріальної точки. У метричних просторах поняття геодезичної лінії узагальнюється поняттям квазігеодезичної лінії. La geodèsica en la geodèsia és la línia més curta que va d'un punt a un altre dins una superfície. Per una esfera, la geodèsica coincideix amb l'ortodròmia, és a dir una línia que segueix un cercle màxim. Segons la teoria de la relativitat general, les partícules viatgen seguint una geodèsica a través de l'espaitemps, i per tant la seva trajectòria depèn de la curvatura. Aquesta curvatura és determinada per la distribució de l'energia, i la massa, segons l'equació d'Einstein. En general la geodèsica pot ser definida per qualsevol . Геодези́ческая (также геодезическая ли́ния) — кривая определённого типа, обобщение понятия «прямая» для искривлённых пространств. Конкретное определение геодезической линии зависит от типа пространства. Например, на двумерной поверхности, вложенной в евклидово трёхмерное пространство, геодезические линии — это линии, достаточно малые дуги которых являются на этой поверхности кратчайшими путями между их концами. На плоскости это будут прямые, на круговом цилиндре — винтовые линии, прямолинейные образующие и окружности, на сфере — дуги больших окружностей. Геодезические линии активно используются в релятивистской физике. Так, пробное тело в общей теории относительности движется по геодезической линии пространства-времени. По сути, временна́я эволюция всех лагранжевых систем может рассматриваться как движение по геодезической в специальном пространстве. Таким образом представима вся теория калибровочных полей. 측지선(測地線, geodesic) 또는 지름길이란 직선의 개념을 굽은 공간으로 일반화한 것이다. Linia geodezyjna (krótko nazywana geodezyjną) – krzywa w przestrzeni metrycznej (ściślej: w G-przestrzeni), stanowiąca najkrótszą drogę pomiędzy dwoma punktami dostatecznie bliskimi. W sposób równoważny linie geodezyjne definiuje się jako krzywe o zerowej . Dla przestrzeni euklidesowej geodezyjne są zwykłymi prostymi.
gold:hypernym: dbr:Generalization
prov:wasDerivedFrom: wikipedia-en:Geodesic?oldid=1122492801&ns=0
dbo:wikiPageLength: 27378
foaf:isPrimaryTopicOf: wikipedia-en:Geodesic

Subject Item: dbr:Geodesic_manifold
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesics
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesics_on_an_ellipsoid
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Glossary_of_aerospace_engineering
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gnomonic_projection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gotthard_Base_Tunnel
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gravity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Great_circle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Boundedly_generated_group
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Brachistochrone_curve
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mock_modular_form
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Morse_theory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Möbius_strip
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Conformal_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Conformal_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Conformally_flat_manifold
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Congruence_(manifolds)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Conjugate_points
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Construction_surveying
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Convex_hull
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Coordinative_definition
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Equivalence_principle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ergodicity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lagrangian_(field_theory)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Tired_light
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Proper_acceleration
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Tensile_structure
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Wiedersehen_pair
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Andrew_Searle_Hart
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Arithmetic_Fuchsian_group
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lena_(river)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Line_(geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Longitude
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lorentz_ether_theory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Luis_Santaló
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mama_Lighthouse
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Boerdijk–Coxeter_helix
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Camassa–Holm_equation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Stereographic_projection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Clifford_parallel
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Clifton–Pohl_torus
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Closed_geodesic
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Comoving_and_proper_distances
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Comparison_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Complex_geodesic
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Complex_projective_space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Økern_(station)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Franz-Erich_Wolter
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fréchet_distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fundamental_polygon
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hamilton–Jacobi_equation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ideal_polyhedron
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Parallel_(geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Pinsky_phenomenon
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Surface_(topology)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Symplectic_group
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Systoles_of_surfaces
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mathematics_of_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Maura_Mast
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Balaïtous
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Banū_Mūsā
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Brithdir_Mawr
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Action_at_a_distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Three-gap_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Tits_metric
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Toshiki_Mabuchi
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Two-body_problem_in_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Drakensberg_hiking
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hadamard's_dynamical_system
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hadamard_space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Heisenberg_group
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lamination_(topology)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Le_Port_(painting)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Raychaudhuri_equation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Orbital_integral
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:SnapPea
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Physical_theories_modified_by_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:24-cell
dbo:wikiPageWikiLink: dbr:Geodesic

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

Subject Item: dbr:600-cell
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:ASTER_(spacecraft)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Action_(physics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Affine_connection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Affine_vector_field
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Akdere,_Silifke
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Anatoly_Fomenko
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:DYE_Stations
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Daigo_Fukuryū_Maru
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Eden_Project
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ergodic_flow
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Euclidean_space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Eugenio_Beltrami
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:European_and_American_voyages_of_scientific_exploration
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Expansion_of_the_universe
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Exponential_map_(Riemannian_geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Extreme_Engineering
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Extremes_on_Earth
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ferdinand_Minding
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:knownFor: dbr:Geodesic

Subject Item: dbr:Fermat's_principle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fike_Model_E
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Finsler_manifold
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-202_Koala
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_Super_Koala
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Force
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Frac_Lorraine
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Angenent_torus
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Nine_dots_puzzle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Parallel_transport
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cauchy's_theorem_(geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cauchy_horizon
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Causal_sets
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Center_of_population
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Form-Z
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Foundations_of_Differential_Geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Four-force
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Four_corners_(Canada)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Frame_fields_in_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Global_analysis
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Glossary_of_Riemannian_and_metric_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Goldberg–Sachs_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Isotropic_line
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Joseph_Clinton
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Katz_centrality
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Killing_tensor
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Knot_theory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Length
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Riemann_curvature_tensor
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_Ig_Nobel_Prize_winners
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_Schütte-Lanz_airships
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Norton's_dome
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Paul_DeFanti
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Symbolic_dynamics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Viveka_Erlandsson
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Geodesic_(disambiguation)
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageDisambiguates: dbr:Geodesic

Subject Item: dbr:List_of_things_named_after_Enrico_Fermi
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Newton's_law_of_universal_gravitation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Riemannian_connection_on_a_surface
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Riemannian_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Riemannian_manifold
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Rigidity_(mathematics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hamiltonian_mechanics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Harmonic_function
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Harmonic_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Harry_Rauch
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hilbert's_problems
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Introduction_to_the_mathematics_of_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Covariant_derivative
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Territorial_claims_in_the_Arctic
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Thaddeus_Vincenty
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:The_Case_for_Mars
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:The_House_of_Sand
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hyperbolic_coordinates
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hyperbolic_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hyperboloid_model
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Tree-graded_space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Star_unfolding
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Area_of_a_circle
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Abelian_sandpile_model
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Kfar_Menahem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Lagrangian_mechanics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Symmetry_(physics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hexapentakis_truncated_icosahedron
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Ray_tracing_(physics)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Tetrad_formalism
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Torsion_tensor
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Zoll_surface
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Theoretical_motivation_for_general_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Redundancy_principle_(biology)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Relative_convex_hull
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Diffeomorphometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Differentiable_curve
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Differential_calculus
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Differential_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Differential_geometry_of_surfaces
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Dome
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Artin_billiard
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:As_the_crow_flies
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Average_path_length
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Margherita_Hack
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Marston_Morse
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Born_coordinates
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Bunch–Davies_vacuum
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Busemann_G-space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Poincaré_disk_model
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Solimana_(volcano)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Spacetime
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Spacetime_symmetries
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Special_relativity
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sphere
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Clairaut's_relation_(differential_geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fermi_coordinates
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Free_body
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Great-circle_distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gromov_boundary
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gromov_product
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Gromov–Hausdorff_convergence
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Hugh_Kenner
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Exponential_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Inertial_frame_of_reference
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: n66:_Voyager)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Kip_Thorne
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Komtar
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mercator_projection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Meridian_(geography)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Metric_space
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Mikhael_Gromov_(mathematician)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Negative_mass
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cartan–Ambrose–Hicks_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cartan–Hadamard_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Cassini_map
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Catalan's_minimal_surface
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Redshift
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Wyoming
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Klein_surface
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Séminaire_Nicolas_Bourbaki
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Wormhole
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Maps_of_manifolds
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:RISE_(sculpture)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Penrose–Hawking_singularity_theorems
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Schild's_ladder
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sudbury_Neutrino_Observatory
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:UV_mapping
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Waterford_Crystal
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Whitehead's_theory_of_gravitation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Solving_the_geodesic_equations
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Euclidean_distance
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Exponential_map_(Lie_theory)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Immersive_Media_Company
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:List_of_variational_topics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sigma_model
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Oblique_Mercator_projection
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sphere-world
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:First_passage_percolation
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:First_variation_of_area_formula
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_Dakota_Hawk
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-101
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-303
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-404
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-505_Skeeter
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_FP-606_Sky_Baby
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Fisher_information_metric
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Photon_surface
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Selberg_zeta_function
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Synge's_world_function
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Yorkshire_Planetarium
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Nonlinear_dimensionality_reduction
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Nonobtuse_mesh
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Palau_Nacional
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Schwarzschild_geodesics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Weyl_tensor
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sabouroff_head
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Theorem_of_the_three_geodesics
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Schloss_Veldenz
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Parabolic_geometry_(differential_geometry)
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Parallel_curve
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Slerp
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Spherical_geometry
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Santaló's_formula
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Rauch_comparison_theorem
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Triodetic_dome
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Unit_disk
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Source_unfolding
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Sectional_curvature
dbo:wikiPageWikiLink: dbr:Geodesic

Subject Item: dbr:Affine_parameter
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_Spray
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_Triangle
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_equation
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_flow
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_length
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_path
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_spray
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Geodesic_triangle
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

Subject Item: dbr:Straightness
dbo:wikiPageWikiLink: dbr:Geodesic
dbo:wikiPageRedirects: dbr:Geodesic

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