Isometries of Clifford Algebras I

Abstract

Let V be a finite dimensional vector space over a field F of characteristic different from 2, and let Q be a nondegenerate, symmetric, bilinear form on V. Let C(V,Q) be the Clifford algebra determined by V and Q. The bilinear form Q extends in a natural way to a nondegenerate, symmetric, bilinear form Q on C(V,Q). Let G be the group of isometries of C(V,Q) relative to Q, and let LG be the Lie algebra of infinitesimal isometries of C(V,Q) relative to Q. We derive some basic structural information about LG, and we compute G in the case that F = R, V = Rn and Q is positive definite on Rn. In a sequel to this paper we determine LG in the case that F = R, V = Rn and Q is nondegenerate on Rn.