On the Operator-valued $\mu$-cosine functions
Representation Theory
2017-01-26 v1
Abstract
Let be a topological abelian group with a neutral element and let be a continuous character of . Let be a complex Hilbert space and let be the algebra of all linear continuous operators of into itself. A continuous mapping will be called an operator-valued -cosine function if it satisfies both the -cosine equation and the condition where is the identity of . We show that any hermitian operator-valued -cosine functions has the form where is a continuous multiplicative operator. As an application, positive definite kernel theory and W. Chojnacki's results on the uniformly bounded normal cosine operator are used to give explicit formula of solutions of the cosine equation.
Cite
@article{arxiv.1701.07229,
title = {On the Operator-valued $\mu$-cosine functions},
author = {Bouikhalene Belaid and Elqorachi Elhoucien},
journal= {arXiv preprint arXiv:1701.07229},
year = {2017}
}
Comments
8pages