On covariant functions and distributions under the action of a compact group

Abstract

Let G be a compact subgroup of GLn() acting linearly on a finite dimensional vector space E. B. Malgrange has shown that the space C∞(n,E)G of C∞ and G-covariant functions is a finite module over the ring C∞(n)G of C∞ and G-invariant functions. First, we generalize this result for the Schwartz space S(n,E)G of G-covariant functions. Secondly, we prove that any G-covariant distribution can be decomposed into a sum of G-invariant distributions multiplied with a fixed family of G-covariant polynomials. This gives a generalization of an Oksak result proved in ([O]).