Dimension of spaces of polynomials on abelian topological semigroups

Abstract

In this paper we study (continuous) polynomials p: J X, where J is an abelian topological semigroup and X is a topological vector space. If J is a subsemigroup with non-empty interior of a locally compact abelian group G and G=J-J, then every polynomial p on J extends uniquely to a polynomial on G. It is of particular interest to know when the spaces Pn (J,X) of polynomials of order at most n are finite dimensional. For example we show that for some semigroups the subspace PnR (J,C) of Riss polynomials (those generated by a finite number of homomorphisms α: J R) is properly contained in Pn (G,C). However, if P1 (J,C) is finite dimensional then PnR (J,C)= Pn (J,C). Finally we exhibit a large family of groups for which Pn (G,C) is finite dimensional.