Weissler and Bernoulli type inequalities in Bergman spaces

Abstract

We consider Weissler type inequalities for Bergman spaces with general radial weights and give conditions on the weight w in terms of its moments ensuring that \|fr\|A2n(w)≤ \|f\|A2(w) whenever n∈ N and 0< r 1/n. For noninteger exponents a special case of this inequality is proved which can be considered as a certain analog of the Bernoulli inequality. An example of a monotonic weight is constructed for which these inequalities are no longer true.