Title of article
Geometric matrix algebra Original Research Article
Author/Authors
Garret Sobczyk، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
11
From page
1163
To page
1173
Abstract
Matrix multiplication was first introduced by Arthur Cayley in 1855 in agreement with the composition of linear transformations. We explore an underlying geometric framework in which matrix multiplication naturally arises from the product of numbers in a geometric (Clifford) algebra. Consequently, all invariants of a linear operator become geometric invariants of the multivectors that they represent. Two different kinds of bases for matrices emerge, a spectral basis of idempotents and nilpotents, and a standard basis of scalars, vectors, bivectors, and higher order k-vectors. The Kronecker product of matrices naturally arises when considering the block structure of a matrix. Conformal geometry of image is expressed in terms of the concept of an h-twistor, which is a generalization of a Penrose twistor.
Keywords
Quaternions , Twistor , Clifford algebra , Conformal transformation , Horosphere , Kronecker product , M?biustransformation , Geometric algebra
Journal title
Linear Algebra and its Applications
Serial Year
2008
Journal title
Linear Algebra and its Applications
Record number
826063
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