On series of translates of positive functions III

Abstract

Suppose is a discrete infinite set of nonnegative real numbers. We say that is of type 1 if the series s(x)=Σλ∈f(x+λ) satisfies a zero-one law. This means that for any non-negative measurable f: R [0,+ ∞) either the convergence set C(f, )=\x: s(x)<+ ∞ \= R modulo sets of Lebesgue zero, or its complement the divergence set D(f, )=\x: s(x)=+ ∞ \= R modulo sets of measure zero. If is not of type 1 we say that is of type 2. In this paper we show that there is a universal with gaps monotone decreasingly converging to zero such that for any open subset G ⊂ R one can find a characteristic function fG such that G ⊂ D(fG, ) and C(fG, )= R G modulo sets of measure zero. We also consider the question whether C(f, ) can contain non-degenerate intervals for continuous functions when D(f, ) is of positive measure. The above results answer some questions raised in a paper of Z. Buczolich, J-P. Kahane, and D. Mauldin.