Entropy of Partitions on Sequential Effect Algebras

Wang Jiamei; Wu Junde; Cho Minhyung

arXiv:0908.2510·math-ph·November 9, 2017

Entropy of Partitions on Sequential Effect Algebras

Wang Jiamei, Wu Junde, Cho Minhyung

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TL;DR

This paper explores how entropy can be defined and analyzed for partitions within the framework of sequential effect algebras, advancing the understanding of quantum logics.

Contribution

It introduces a method to establish partitions and refinements of quantum logics using sequential effect algebra theory and studies their entropies.

Findings

01

Defined entropy for partitions in sequential effect algebras

02

Analyzed properties of quantum logic partitions

03

Provided insights into quantum information measures

Abstract

By using the sequential effect algebra theory, we establish the partitions and refinements of quantum logics and study their entropies.

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Taxonomy

TopicsAdvanced Algebra and Logic