Polynomials with exponents in compact convex sets and associated weighted extremal functions -- The Siciak-Zakharyuta theorem

Abstract

The classical Siciak-Zakharyuta theorem states that the Siciak-Zakharyuta function VE of a subset E of Cn, also called a pluricomplex Green function or global exremal function of E, equals the logarithm of the Siciak function E if E is compact. The Siciak-Zakharyuta function is defined as the upper envelope of functions in the Lelong class that are negative on E, and the Siciak function is the upper envelope of m-th roots of polynomials p in Pm( Cn) of degree ≤ m such that |p|≤ 1 on E. We generalize the Siciak-Zakharyuta theorem to the case where the polynomial space Pm( Cn) is replaced by PmS( Cn) consisting of all polynomials with exponents restricted to sets mS, where S is a compact convex subset of Rn+ with 0∈ S. It states that if q is an admissible weight on a closed set E in Cn then VSE,q=SE,q on C*n if and only if the rational points in S form a dense subset of S.