On a class of translation-invariant spaces of quasianalytic ultradistributions

Abstract

A class of translation-invariant Banach spaces of quasianalytic ultradistributions is introduced and studied. They are Banach modules over a Beurling algebra. Based on this class of Banach spaces, we define corresponding test function spaces D*E and their strong duals D'*E' of quasianalytic type, and study convolution and multiplicative products on D'*E'. These new spaces generalize previous works about translation-invariant spaces of tempered (non-quasianalytic ultra-) distributions; in particular, our new considerations apply to the settings of Fourier hyperfunctions and ultrahyperfunctions. New weighted D'Lpη spaces of quasianalytic ultradistributions are analyzed.