Wilson Bases and Ultramodulation Spaces

## Abstract We show that the recently discovered WILSON bases of exponential decay are unconditional bases for all modulation spaces on __R__, including the classical BESSEL potential spaces, the Segal algebra __S__~o~, and the SCHWARTZ space. As a consequence we obtain new bases for spaces of enti

## Abstract A Fréchet space __E__ is quasi‐reflexive if, either dim(__E__″/__E__) < ∞, or __E__″[__β__(__E__″,__E__′)]/__E__ is isomorphic to __ω__. A Fréchet space __E__ is totally quasi‐reflexive if every separated quotient is quasi‐reflexive. In this paper we show, using Schauder bases, that __E

## Abstract The aim of this paper is twofold. First we prove that inhomogeneous wavelets of Daubechies type are unconditional Schauder bases in weighted function spaces of __B^s^~pq~__ and __F^s^~pq~__ type. Secondly we use these results to estimate entropy numbers of compact embeddings between the

## Abstract In spline spaces there are often totally positive bases possessing a strong property called almost strictly total positivity. In this paper, it is proved that, for totally positive bases of continuous functions __B__, the following concepts are equivalent: (i) __B__ is almost strictly t