On certain modules of covariants in exterior algebras

Abstract

We study the structure of the space of covariants B:=( ( g/ k)* g) k, for a certain class of infinitesimal symmetric spaces ( g, k) such that the space of invariants A:=( ( g/ k)*) k is an exterior algebra (x1,...,xr), with r=rk( g)-rk( k). We prove that they are free modules over the subalgebra Ar-1= (x1,...,xr-1) of rank 4r. In addition we will give an explicit basis of B. As particular cases we will recover same classical results. In fact we will describe the structure of ( (Mn)* Mn)G, the space of the G-equivariant matrix valued alternating multilinear maps on the space of (skew-symmetric or symmetric with respect to a specific involution) matrices, where G is the symplectic group or the odd orthogonal group. Furthermore we prove new polynomial trace identities.