A symmetric biderivation structure on polynomial algebras and a class of modules over the special Jordan algebra Hn(K) of symmetric matrices

Abstract

There exists a biderivation structure on the polynomial algebra A[n] = K[x1,…,xn], where K is a field with char(K) 2, defined by f h = Σi=1n ∂ f∂ xi\,∂ h∂ xi. Let Ak[n] denote the subspace of homogeneous polynomials of degree k. Then (A2[n],) is a Jordan algebra, isomorphic to the special Jordan algebra Hn(K) of n× n symmetric matrices. Each Ak[n] is a natural A2[n]-bimodule, which admits a weight space decomposition with respect to a complete set of mutually orthogonal idempotents. In particular, the weight space decomposition of A2[n] coincides with its Peirce decomposition. Ak[n] is a Jordan bimodule if and only if k=0,1,2. Equivalently, for all k 3, Ak[n] is not a Jordan bimodule. The group of algebra automorphisms of (A[n],·,) that preserve each homogeneous component Ak[n] is isomorphic to the orthogonal group O(n,K). If char(K)=0, then the algebra (A[n],·,) is simple, i.e., it has no nonzero proper ideals. Moreover, in this case, each Ak[n] is a simple A2[n]-bimodule.