Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Multivector> ?p ?o }
- Multivector abstract "A multivector is the result of a product defined for elements in a vector space V. A vector space with a linear product operation between vectors is called an algebra; examples are matrix algebra and vector algebra. The algebra of multivectors is constructed using the wedge product ∧ and is related to the exterior algebra of differential forms.The set of multivectors on a vector space V is graded by the number of basis vectors that form a basis multivector. A multivector that is the product of p basis vectors is called a rank p multivector, or a p-vector. The linear combination of basis p-vectors forms a vector space denoted as Λp(V). The maximum rank of a multivector is the dimension of the vector space V.The product of a p-vector and a k-vector is a (k+p)-vector so the set of linear combinations of all multivectors on V is an associative algebra, which is closed with respect to the wedge product. This algebra, denoted by Λ(V), is called the exterior algebra of V.".
- Multivector wikiPageID "2727288".
- Multivector wikiPageLength "29289".
- Multivector wikiPageOutDegree "52".
- Multivector wikiPageRevisionID "683661834".
- Multivector wikiPageWikiLink Affine_space.
- Multivector wikiPageWikiLink Algebra_of_physical_space.
- Multivector wikiPageWikiLink Algebra_over_a_field.
- Multivector wikiPageWikiLink Antisymmetric_tensor.
- Multivector wikiPageWikiLink Bivector.
- Multivector wikiPageWikiLink Blade_(geometry).
- Multivector wikiPageWikiLink Category:Differential_geometry.
- Multivector wikiPageWikiLink Category:Geometric_algebra.
- Multivector wikiPageWikiLink Category:Multilinear_algebra.
- Multivector wikiPageWikiLink Category:Tensors.
- Multivector wikiPageWikiLink Classification_of_electromagnetic_fields.
- Multivector wikiPageWikiLink Clifford_algebra.
- Multivector wikiPageWikiLink Differential_form.
- Multivector wikiPageWikiLink Differential_forms.
- Multivector wikiPageWikiLink Duality_(projective_geometry).
- Multivector wikiPageWikiLink Einstein_notation.
- Multivector wikiPageWikiLink Einstein_summation_convention.
- Multivector wikiPageWikiLink Ellipsoid.
- Multivector wikiPageWikiLink Euclidean_vector.
- Multivector wikiPageWikiLink Exterior_algebra.
- Multivector wikiPageWikiLink Four-dimensional_space.
- Multivector wikiPageWikiLink Geometric_algebra.
- Multivector wikiPageWikiLink Grassmann_coordinates.
- Multivector wikiPageWikiLink Hodge_dual.
- Multivector wikiPageWikiLink Hodge_star_operator.
- Multivector wikiPageWikiLink Hypervolume.
- Multivector wikiPageWikiLink Inner_product.
- Multivector wikiPageWikiLink Inner_product_space.
- Multivector wikiPageWikiLink Norm_(mathematics).
- Multivector wikiPageWikiLink Orientation_(vector_space).
- Multivector wikiPageWikiLink Parallelepiped.
- Multivector wikiPageWikiLink Parallelotope.
- Multivector wikiPageWikiLink Paravector.
- Multivector wikiPageWikiLink Plücker_coordinates.
- Multivector wikiPageWikiLink Plücker_embedding.
- Multivector wikiPageWikiLink Projective_space.
- Multivector wikiPageWikiLink Pseudoscalar.
- Multivector wikiPageWikiLink Pseudovector.
- Multivector wikiPageWikiLink Quaternion.
- Multivector wikiPageWikiLink Scalar_(mathematics).
- Multivector wikiPageWikiLink Tangent_space.
- Multivector wikiPageWikiLink Tensor_product.
- Multivector wikiPageWikiLink Vector_(geometric).
- Multivector wikiPageWikiLink Vector_calculus.
- Multivector wikiPageWikiLink Vector_space.
- Multivector wikiPageWikiLink Volume_form.
- Multivector wikiPageWikiLink Wedge_product.
- Multivector wikiPageWikiLink William_Kingdon_Clifford.
- Multivector wikiPageWikiLinkText "''k''-vector".
- Multivector wikiPageWikiLinkText "''n''-vector".
- Multivector wikiPageWikiLinkText "''p''-vector".
- Multivector wikiPageWikiLinkText "''p''-vectors and multivectors".
- Multivector wikiPageWikiLinkText "Multivector".
- Multivector wikiPageWikiLinkText "Multivector#Geometric algebra".
- Multivector wikiPageWikiLinkText "multivector".
- Multivector wikiPageWikiLinkText "trivector".
- Multivector wikiPageWikiLinkText "trivectors".
- Multivector b "p".
- Multivector caption "Orientation defined by an ordered set of vectors.".
- Multivector caption "Reversed orientation corresponds to negating the exterior product.".
- Multivector footer "-dimensional boundary and on which side the interior is.".
- Multivector footer "123".
- Multivector footer "Geometric interpretation of grade n elements in a real exterior algebra for".
- Multivector footer "n = 0".
- Multivector footer "n − 1".
- Multivector hasPhotoCollection Multivector.
- Multivector image "N vector negative png version.png".
- Multivector image "N vector positive png version.png".
- Multivector p "n".
- Multivector width "220".
- Multivector wikiPageUsesTemplate Template:Main.
- Multivector wikiPageUsesTemplate Template:Multiple_image.
- Multivector wikiPageUsesTemplate Template:Redirect.
- Multivector wikiPageUsesTemplate Template:Reflist.
- Multivector wikiPageUsesTemplate Template:See_also.
- Multivector wikiPageUsesTemplate Template:Su.
- Multivector wikiPageUsesTemplate Template:Tensors.
- Multivector subject Category:Differential_geometry.
- Multivector subject Category:Geometric_algebra.
- Multivector subject Category:Multilinear_algebra.
- Multivector subject Category:Tensors.
- Multivector hypernym Result.
- Multivector type Algebra.
- Multivector type Concept.
- Multivector type Physic.
- Multivector type Tensor.
- Multivector type Thing.
- Multivector comment "A multivector is the result of a product defined for elements in a vector space V. A vector space with a linear product operation between vectors is called an algebra; examples are matrix algebra and vector algebra. The algebra of multivectors is constructed using the wedge product ∧ and is related to the exterior algebra of differential forms.The set of multivectors on a vector space V is graded by the number of basis vectors that form a basis multivector.".
- Multivector label "Multivector".
- Multivector seeAlso Blade_(geometry).
- Multivector sameAs Multivecteur.
- Multivector sameAs m.07_9jy.
- Multivector sameAs Поливектор.
- Multivector sameAs Multivektor.
- Multivector sameAs Полівектор.