Almost commuting self-adjoint operators and measurements
Abstract
We study the problem when an almost commuting -tuple self-adjoint operators in an infinite dimensional separable Hilbert space is close to an -tuple of commuting self-adjoint operators on We give an affirmative answer to the problem when the synthetic-spectrum and the essential synthetic-spectrum are close. Examples are also exhibited that, in general, the answer to the problem when is negative even the associated Fredholm index vanishes. In the case that we show that a pair of almost commuting self-adjoint operators in an infinite dimensional separable Hilbert space is close to a commuting pair of self-adjoint operators if and only if a corresponding Fredholm index vanishes outside of an essential synthetic-spectrum. This is an attempt to solve a problem proposed by David Mumford related to quantum theory and measurements.
Cite
@article{arxiv.2401.04018,
title = {Almost commuting self-adjoint operators and measurements},
author = {Huaxin Lin},
journal= {arXiv preprint arXiv:2401.04018},
year = {2025}
}
Comments
v2 is a revision