The Internal Polya Inequality for C-convex Domains in Cn

Abstract

Let K⊂ C be a polynomially convex compact set, f be a function analytic in a domain C K with Taylor expansion f( z) =Σk=0∞ akzk+1 at ∞ , and Hs( f) := ( ak+l) k,l=0s related Hankel determinants. The classical Polya theorem % P says that \[ s→ ∞ Hs( f) 1/s2≤ d( K) , \]% where d( K) is the transfinite diameter of K. The main result of this paper is multivariate internal analogs of Polya's inequality for C-convex (=strictly linearly convex) domains D⊂ Cn and weighted Hankel-type determinants, constructed from the Taylor coefficients of a function f∈ A( D) at a given point % a∈ D; therewith the weights are generated by s-indicatrices of the sequence of analytic functionals biorthogonal to the system of monomials in % Cn. It is proved by the reduction to the outer multivariate analog of Polya's inequality (Zakharyuta, Math. USSR Sbornik, 25 % (1975)) and is based on the characterization of the strict linear convexity in terms of s-indicatrices (S. Znamenskii, Siberian Math. J. 26 (1985)).