Time Eigenvalues for the One-dimensional Infinite Square Well

David M. Rosenbaum

arXiv:0912.1587·quant-ph·December 10, 2009

Time Eigenvalues for the One-dimensional Infinite Square Well

David M. Rosenbaum

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TL;DR

This paper derives discrete time eigenvalues for the one-dimensional infinite square well, providing a novel perspective on quantum energy levels in a time domain context.

Contribution

It introduces a new approach to quantum systems by calculating time eigenvalues for the infinite square well, expanding traditional energy eigenvalue analysis.

Findings

01

Discrete time eigenvalues are successfully derived.

02

The method offers insights into quantum dynamics in the time domain.

03

Potential applications in quantum control and information processing.

Abstract

Discrete time eigenvalues are found for the Infinite Square Well.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Numerical methods in inverse problems · Quantum chaos and dynamical systems