On the conjugate weight function and ultradifferentiable classes of entire functions

TL;DR

This paper introduces the conjugate weight function concept, studies ultradifferentiable classes of entire functions with fast-growing weights, and extends results to operator boundedness detection in Hilbert spaces.

Contribution

It develops the theory of conjugate weight functions and matrices, applying them to ultradifferentiable classes and operator theory, bridging weight sequences and functions.

Findings

Introduces conjugate weight functions and studies their properties.

Extends ultradifferentiable class results from weight sequences to functions.

Shows how these classes can detect boundedness of operators in Hilbert spaces.

Abstract

We introduce the new notion of a conjugate weight function and provide a detailed study of this operation and its properties. Then we apply this knowledge to study classes of ultradifferentiable functions defined in terms of fast growing weight functions in the sense of Braun-Meise-Taylor and hence violating standard regularity requirements. Therefore, we transfer recent results shown by the author and D.N. Nenning from the weight sequence to the weight function framework. In order to proceed and to complete the picture we also define the conjugate associated weight matrix and investigate the relation to conjugate weight sequences via the corresponding associate weight functions. Finally, as it has already been done in the weight sequence case, we generalize results by M. Markin from the small Gevrey-setting and show how the corresponding non-standard ultradifferentiable function classes can be used to detect boundedness of normal linear operators on Hilbert spaces (associated with an evolution equation problem). On the one hand, when involving the weight matrix here the crucial information concerning regularity of the weak solutions can be expressed in terms of only one weight, namely of the given weight function. But, on the other hand, for the connection to the weighted entire setting the required conditions on the weight function are too restrictive in the general case.