Finite Section Method for singular integrals with operator-valued PQC-coefficients and a flip
Abstract
We establish necessary and sufficient conditions for the stability of the finite section method for operators belonging to a certain -algebra of operators acting on the Hilbert space of -valued sequences where is a given Hilbert space. Identifying with the -space over the unit circle, the -algebra in question is the one which contains all singular integral operators with flip and piecewise quasicontinous -valued generating functions on the unit circle. The result is a generalization of an older result where the same problem, but without the flip operator was considered. The stability criterion is obtained via -algebra methods and says that a sequence of finite sections is stable if and only if certain operators associated with that sequence (via -homomorphisms) are invertible.
Keywords
Cite
@article{arxiv.1906.07722,
title = {Finite Section Method for singular integrals with operator-valued PQC-coefficients and a flip},
author = {Torsten Ehrhardt and Zheng Zhou},
journal= {arXiv preprint arXiv:1906.07722},
year = {2019}
}