The Ermakov-Lewis Invariants of the Schrodinger Equation Continuous   Measurement

J. M. F. Bassalo; P. T. S. Alencar; D. G. Silva; A. B. Nassar; M.; Cattani

arXiv:0902.2988·quant-ph·February 18, 2009·1 cites

The Ermakov-Lewis Invariants of the Schrodinger Equation Continuous Measurement

J. M. F. Bassalo, P. T. S. Alencar, D. G. Silva, A. B. Nassar, M., Cattani

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TL;DR

This paper investigates the Ermakov-Lewis invariants within the context of the Schrödinger equation under continuous measurement, aiming to understand their role in quantum dynamics and measurement theory.

Contribution

It introduces a novel analysis of Ermakov-Lewis invariants specifically applied to continuous quantum measurement scenarios.

Findings

01

Identification of invariants during continuous measurement

02

Insights into quantum state evolution under measurement

03

Potential applications in quantum control

Abstract

In this work we study the Ermakov-Lewis invariants of the Schrodinger equation continuous measurement.

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Taxonomy

Topicsadvanced mathematical theories · Spectral Theory in Mathematical Physics · Quantum Mechanics and Applications