This HTML5 document contains 91 embedded RDF statements represented using HTML+Microdata notation.

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

Namespace Prefixes

PrefixIRI
dbpedia-dehttp://de.dbpedia.org/resource/
dctermshttp://purl.org/dc/terms/
yago-reshttp://yago-knowledge.org/resource/
dbohttp://dbpedia.org/ontology/
n16http://dbpedia.org/resource/File:
foafhttp://xmlns.com/foaf/0.1/
n15https://global.dbpedia.org/id/
yagohttp://dbpedia.org/class/yago/
dbthttp://dbpedia.org/resource/Template:
rdfshttp://www.w3.org/2000/01/rdf-schema#
freebasehttp://rdf.freebase.com/ns/
dbpedia-pthttp://pt.dbpedia.org/resource/
n5http://commons.wikimedia.org/wiki/Special:FilePath/
dbpedia-azhttp://az.dbpedia.org/resource/
rdfhttp://www.w3.org/1999/02/22-rdf-syntax-ns#
owlhttp://www.w3.org/2002/07/owl#
wikipedia-enhttp://en.wikipedia.org/wiki/
dbpedia-frhttp://fr.dbpedia.org/resource/
dbphttp://dbpedia.org/property/
dbchttp://dbpedia.org/resource/Category:
provhttp://www.w3.org/ns/prov#
xsdhhttp://www.w3.org/2001/XMLSchema#
wikidatahttp://www.wikidata.org/entity/
dbrhttp://dbpedia.org/resource/
dbpedia-jahttp://ja.dbpedia.org/resource/

Statements

Subject Item
dbr:Regular_grid
rdf:type
yago:Procedure101023820 yago:Abstraction100002137 yago:Communication100033020 yago:WikicatGeometricAlgorithms yago:WikicatGeometricGraphs yago:Event100029378 yago:VisualCommunication106873252 yago:Activity100407535 yago:Act100030358 yago:Algorithm105847438 yago:PsychologicalFeature100023100 yago:Graph107000195 yago:Rule105846932 yago:YagoPermanentlyLocatedEntity
rdfs:label
マップドメッシュ Maillage Gitter (Geometrie) Grade cartesiana Regular grid
rdfs:comment
Ein Gitter in der Geometrie ist eine lückenlose und überlappungsfreie Partition eines Raumes durch eine Menge von Gitterzellen. Die Gitterzellen werden definiert durch eine Menge von Gitterpunkten, die untereinander durch eine Menge von Gitterlinien verbunden sind. Gitter werden in der Naturwissenschaft und Technik zur Vermessung, Modellierung und für numerische Berechnungen verwendet (siehe Gittermodell). Uma grade regular é uma tesselação de um Espaço euclidiano de n dimensões criado por paralelepípedos. Grades desse tipo aparecem em papéis milimetrados e podem ser usados em Método dos elementos finitos, assim como em Método dos volumes finitos e em Método das diferenças finitas. Como as derivadas de campo são expressas convenientemente como diferenças finitas, grades estruturadas aparecem muito em metodos de diferença finita. Grades desestruturadas oferecem mais flexibilidade que grades estruturadas e, por isso, são mais úteis em metodos de volume e elementos finitos. マップドメッシュ(mapped mesh)は、主に数値解析で使用されるメッシュ生成法の一つで、構造格子を生成する方法である。作成方法の一つとして、有限要素法の形状関数を使用して作成することができる。 Un maillage est la discrétisation spatiale d'un milieu continu, ou aussi, une modélisation géométrique d’un domaine par des éléments proportionnés finis et bien définis. L'objet d'un maillage est de procéder à une simplification d'un système par un modèle représentant ce système et, éventuellement, son environnement (le milieu), dans l'optique de simulations de calculs ou de représentations graphiques. On parle également dans le langage commun de pavage. A regular grid is a tessellation of n-dimensional Euclidean space by congruent parallelotopes (e.g. bricks). Its opposite is irregular grid. Grids of this type appear on graph paper and may be used in finite element analysis, finite volume methods, finite difference methods, and in general for discretization of parameter spaces. Since the derivatives of field variables can be conveniently expressed as finite differences, structured grids mainly appear in finite difference methods. Unstructured grids offer more flexibility than structured grids and hence are very useful in finite element and finite volume methods.
foaf:depiction
n5:Regular_grid.svg n5:Example_curvilinear_grid.svg n5:Tiling_3_simple.svg n5:Cartesian_grid.svg n5:rectilinear_grid.svg n5:Curvilinear_grid.svg
dcterms:subject
dbc:Lattice_points dbc:Mesh_generation dbc:Tessellation
dbo:wikiPageID
3771917
dbo:wikiPageRevisionID
1122838403
dbo:wikiPageWikiLink
dbr:Parallelogram dbr:Finite_difference_method dbr:Rectangular_cuboid dbr:Tessellation dbr:Graph_paper dbr:Parallelepiped dbr:Finite_element_analysis n16:Regular_grid.svg dbr:Rectangle dbc:Lattice_points dbc:Mesh_generation dbr:Coordinate dbr:Point_(geometry) dbr:Unstructured_grid dbr:Cuboid dbr:Euclidean_space dbr:Unit_cube dbr:Rhombohedron dbr:Brick dbr:Rhombus dbr:Dimension dbr:Unit_square dbr:Vertex_(geometry) dbr:Integer_lattice dbc:Tessellation dbr:Logarithmic_scale dbr:Congruence_(geometry) dbr:Finite_volume_method dbr:Rectangular_parallelepiped dbr:Quadrilateral
owl:sameAs
dbpedia-pt:Grade_cartesiana freebase:m.09_4vc dbpedia-de:Gitter_(Geometrie) dbpedia-fr:Maillage n15:2UqsS wikidata:Q2646942 dbpedia-az:Meşinq yago-res:Regular_grid dbpedia-ja:マップドメッシュ
dbp:wikiPageUsesTemplate
dbt:Anchor dbt:Short_description dbt:Gallery dbt:More_citations_needed dbt:Elementary-geometry-stub dbt:Tessellation dbt:Annotated_link dbt:Reflist
dbo:thumbnail
n5:Regular_grid.svg?width=300
dbo:abstract
Ein Gitter in der Geometrie ist eine lückenlose und überlappungsfreie Partition eines Raumes durch eine Menge von Gitterzellen. Die Gitterzellen werden definiert durch eine Menge von Gitterpunkten, die untereinander durch eine Menge von Gitterlinien verbunden sind. Gitter werden in der Naturwissenschaft und Technik zur Vermessung, Modellierung und für numerische Berechnungen verwendet (siehe Gittermodell). マップドメッシュ(mapped mesh)は、主に数値解析で使用されるメッシュ生成法の一つで、構造格子を生成する方法である。作成方法の一つとして、有限要素法の形状関数を使用して作成することができる。 Un maillage est la discrétisation spatiale d'un milieu continu, ou aussi, une modélisation géométrique d’un domaine par des éléments proportionnés finis et bien définis. L'objet d'un maillage est de procéder à une simplification d'un système par un modèle représentant ce système et, éventuellement, son environnement (le milieu), dans l'optique de simulations de calculs ou de représentations graphiques. On parle également dans le langage commun de pavage. A regular grid is a tessellation of n-dimensional Euclidean space by congruent parallelotopes (e.g. bricks). Its opposite is irregular grid. Grids of this type appear on graph paper and may be used in finite element analysis, finite volume methods, finite difference methods, and in general for discretization of parameter spaces. Since the derivatives of field variables can be conveniently expressed as finite differences, structured grids mainly appear in finite difference methods. Unstructured grids offer more flexibility than structured grids and hence are very useful in finite element and finite volume methods. Each cell in the grid can be addressed by index (i, j) in two dimensions or (i, j, k) in three dimensions, and each vertex has coordinates in 2D or in 3D for some real numbers dx, dy, and dz representing the grid spacing. Uma grade regular é uma tesselação de um Espaço euclidiano de n dimensões criado por paralelepípedos. Grades desse tipo aparecem em papéis milimetrados e podem ser usados em Método dos elementos finitos, assim como em Método dos volumes finitos e em Método das diferenças finitas. Como as derivadas de campo são expressas convenientemente como diferenças finitas, grades estruturadas aparecem muito em metodos de diferença finita. Grades desestruturadas oferecem mais flexibilidade que grades estruturadas e, por isso, são mais úteis em metodos de volume e elementos finitos. Cada célula na grade pode ser endereçada pelo índice em duas (i,j) ou três (i,j,k) dimensões, e cada vértice tem coordenadas em 2D ou em 3D para algum número real dx, dy e dz representando o espaço da grade.
prov:wasDerivedFrom
wikipedia-en:Regular_grid?oldid=1122838403&ns=0
dbo:wikiPageLength
3578
foaf:isPrimaryTopicOf
wikipedia-en:Regular_grid