Spectral resolutions in effect algebras
Abstract
Effect algebras were introduced as an abstract algebraic model for Hilbert space effects representing quantum mechanical measurements. We study additional structures on an effect algebra that enable us to define spectrality and spectral resolutions for elements of akin to those of self-adjoint operators. These structures, called compression bases, are special families of maps on , analogous to the set of compressions on operator algebras, order unit spaces or unital abelian groups. Elements of a compression base are in one-to-one correspondence with certain elements of , called projections. An effect algebra is called spectral if it has a distinguished compression base with two special properties: the projection cover property (i.e., for every element in there is a smallest projection majorizing ), and the so-called b-comparability property, which is an analogue of general comparability in operator algebras or unital abelian groups. It is shown that in a spectral archimedean effect algebra , every admits a unique rational spectral resolution and its properties are studied. If in addition possesses a separating set of states, then every element is determined by its spectral resolution. It is also proved that for some types of interval effect algebras (with RDP, archimedean divisible), spectrality of is equivalent to spectrality of its universal group and the corresponding rational spectral resolutions are the same. In particular, for convex archimedean effect algebras, spectral resolutions in are in agreement with spectral resolutions in the corresponding order unit space.
Cite
@article{arxiv.2111.02166,
title = {Spectral resolutions in effect algebras},
author = {Anna Jenčová and Sylvia Pulmannová},
journal= {arXiv preprint arXiv:2111.02166},
year = {2022}
}
Comments
31 pages, accepted in Quantum, comments welcome