Unitary Inequivalent Representations and Quantum Physics

Arman Stepanian; Mahsa Kohandel

arXiv:1312.3239·quant-ph·February 7, 2017·1 cites

Unitary Inequivalent Representations and Quantum Physics

Arman Stepanian, Mahsa Kohandel

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TL;DR

This paper explores the concept of unitary inequivalent representations in quantum physics and highlights their significance in addressing unresolved problems in theoretical physics.

Contribution

It emphasizes the importance of unitary inequivalent representations for understanding and solving key issues in quantum theories.

Findings

01

Unitary inequivalent representations are crucial for understanding quantum field theory.

02

The concept helps address outstanding problems in theoretical physics.

03

The paper clarifies the role of these representations in physical theories.

Abstract

In this paper we discuss the unitary inequivalentness in quantum physics. Then based on some of the current outstanding problems in theoretical physics, we will show the important role of this concept to better understand the physical theories.

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Taxonomy

TopicsQuantum Electrodynamics and Casimir Effect · Quantum Mechanics and Applications · Advanced Thermodynamics and Statistical Mechanics