Invariants of symplectic and orthogonal groups acting on GL(n, C)-modules

Abstract

Let GL(n) = GL(n, C) denote the complex general linear group and let G ⊂ GL(n) be one of the classical complex subgroups O(n), SO(n), and Sp(2k) (in the case n = 2k). We take a polynomial GL(n)-module W and consider the symmetric algebra S(W). Extending previous results for G=SL(n), we develop a method for determining the Hilbert series H(S(W)G, t) of the algebra of invariants S(W)G. Then we give explicit examples for computing H(S(W)G, t). As a further application, we extend our method to compute also the Hilbert series of the algebras of invariants (S2 V)G and (2 V)G, where V = Cn denotes the standard GL(n)-module.