Selective continuous quantum measurements: Restricted path integrals and   wave equations

Lajos Diosi

arXiv:quant-ph/9501009·quant-ph·September 8, 2016·3 cites

Selective continuous quantum measurements: Restricted path integrals and wave equations

Lajos Diosi

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Open Access

TL;DR

This paper reviews and connects the restricted path integral and wave equation methods in continuous quantum measurements, transforming Mensky's effective wave equation into Ito-differential equations for better analysis.

Contribution

It introduces a transformation of Mensky's effective wave equation with complex Hamiltonian into Ito-differential equations, enhancing the theoretical framework.

Findings

01

Unified the RPI and WE approaches in quantum measurement theory

02

Transformed Mensky's effective WE into Ito-differential equations

03

Provided a more complete review of continuous quantum measurement techniques

Abstract

We discuss both the restricted path integral (RPI) and the wave equation (WE) techniques in the theory of continuous quantum measurements. We intend to make Mensky's fresh review complete by transforming his "effective" WE with complex Hamiltonian into Ito-differential equations.

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Taxonomy

TopicsQuantum Mechanics and Applications · Quantum Information and Cryptography