The minimum modulus of gap power series and h-measure of exceptional sets

Abstract

For entire Dirichlet series of the form F(z)=Σn=0+∞ anezλn,\ 0λn+∞\ (n+∞), we establish conditions under which the relation F(x+iy)=(1+o(1))a(x,F)e(x+iy)λ(x,F) is true as x+∞ outside some set E such that h-meas (E)=∫Edh(x)<+∞ uniformly in y∈R, where h(x) is positive continuous function increasing to +∞ on [0,+∞) with non-decreasing to +∞ derivative.