Weak polynomial identities for a vector space with a symmetric bilinear form

Abstract

Let Vk be a k-dimensional vector space with a non-degenerate symmetric bilinear form over a field K of characteristic 0 and let Ck be the Clifford algebra on Vk. We study the weak polynomial identities of the pair (Ck,Vk). We establish that all they follow from [x12,x2]=0 when k=∞ and from [x12,x2]=0 and Sk+1(x1,…,xk+1)=0 when k<∞. We also prove that the weak identity [x12,x2]=0 satisfies the Specht property. As a consequence we obtain a new proof of the theorem of Razmyslov that the weak Lie polynomial identities of the pair (M2(K),sl2(K)) follow from [x12,x2]=0.