Quantum Observable Generalized Orthoalgebras
Abstract
Let denote the set of all self-adjoint operators (not necessarily bounded) on a Hilbert space , which is the set of all physical quantities on a quantum system . We introduce a binary relation on . We show that if , then and are affiliated with some abelian von Neumann algebra. The relation induces a partial algebraic operation on . We prove that is a generalized orthoalgebra. This algebra is a generalization of the famous Birkhoff\,--\,von Neumann quantum logic model. It establishes a mathematical structure on all physical quantities on . In particular, we note that has a partial order , and prove that if and only if has a value in implies that has a value in for every Borel set not containing . Moreover, the existence of the infimum and supremum for (with respect to ) is studied, and it is shown at the end that the position operator and momentum operator in the Heisenberg commutation relation satisfy .
Cite
@article{arxiv.1508.07386,
title = {Quantum Observable Generalized Orthoalgebras},
author = {Qiang Lei and Weihua Liu and Zhe Liu and Junde Wu},
journal= {arXiv preprint arXiv:1508.07386},
year = {2021}
}