Levy's phenomenon for entire functions of several variables

Abstract

For entire functions f(z)=Σn=0+∞anzn, z∈ C, P. L evy (1929) established that in the classical Wiman's inequality Mf(r)≤μf(r)× ×(μf(r))1/2+,\ >0, which holds outside a set of finite logarithmic measure, the constant 1/2 can be replaced almost surely in some sense, by 1/4; here Mf(r)=\|f(z)| |z|=r\,\ μf(r)=\|an|rn n≥0\,\ r>0. In this paper we prove that the phenomenon discovered by P. Levy holds also in the case of Wiman's inequality for entire functions of several variables, which gives an affirmative answer to the question of A. A. Goldberg and M. M. Sheremeta (1996) on the possibility of this phenomenon.