Subharmonic addition to the Beurling-Malliavin multiplier theorem

Abstract

We prove a version of the Beurling-Malliavin multiplier theorem. This version is formulated here in a simplified form. Let u -∞ and M -∞ be a pair of subharmonic functions on the complex plane C with positive parts u+:=\u,0\ and M+ such that type[u]:=z ∞ u+(z)|z|<+∞, type[M]<+∞, ∫-∞+∞u+(x)+M+(x)1+x2dx<+∞. If type[u]<a<+∞, 0<b<+∞, and type[M]<c<+∞, then there are an entire function h 0 with type[|h|]<c and a subset iY in the imaginary axis i R of linear Lebesgue measure <b such that the function h is bounded on the real axis and u(z)-M(z)+|h(z)|≤ a| z| on each straight line parallel to the real axis and not intersecting iY.