Multivector and multivector matrix inverses in real Clifford algebras
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摘要
We show how to compute the inverse of multivectors in finite dimensional real Clifford algebras Cl(p, q). For algebras over vector spaces of fewer than six dimensions, we provide explicit formulae for discriminating between divisors of zero and invertible multivectors, and for the computation of the inverse of a general invertible multivector. For algebras over vector spaces of dimension six or higher, we use isomorphisms between algebras, and between multivectors and matrix representations with multivector elements in Clifford algebras of lower dimension. Towards this end we provide explicit details of how to compute several forms of isomorphism that are essential to invert multivectors in arbitrarily chosen algebras. We also discuss briefly the computation of the inverses of matrices of multivectors by adapting an existing textbook algorithm for matrices to the multivector setting, using the previous results to compute the required inverses of individual multivectors.
论文关键词:Clifford algebra,Inverse,Multivector matrix algebra
论文评审过程:Received 22 July 2016, Revised 14 February 2017, Accepted 2 May 2017, Available online 23 May 2017, Version of Record 23 May 2017.
论文官网地址:https://doi.org/10.1016/j.amc.2017.05.027