Polynomials with exponents in compact convex sets and associated weighted extremal functions -- Characterization of polynomials by L2-estimates

Abstract

The main result of this paper is that an entire function f that is in L2( Cn,) with respect to the weight (z)=2mHS(z)+γ(1+|z|2) is a polynomial with exponents in m S. Here HS is the logarithmic supporting function of a compact convex set S⊂ Rn+ with 0∈ S, γ≥ 0 is small enough in terms of m, and S is the hull of S with respect to a certain cone depending on S, m and γ. An example showing that in general S can not be replaced by S is constructed.