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Main Authors: Guerrero, Julio, López-Ruiz, Francisco F.
Format: Preprint
Published: 2021
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Online Access:https://arxiv.org/abs/2112.00872
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author Guerrero, Julio
López-Ruiz, Francisco F.
author_facet Guerrero, Julio
López-Ruiz, Francisco F.
contents Perelomov coherent states for equally spaced, infinite homogeneous waveguide arrays with Euclidean E(2) symmetry are defined, and a new resolution of the identity is obtained. The key point to construct this novel resolution of the identity is the fact that coherent states satisfy the Helmholtz equation (in coherent states labels), and thus every coherent state belongs to a one-parameter family uniquely determined by the Cauchy initial data of the coherent state in a one-dimensional Cauchy set. For this reason we call \textit{Cauchy coherent} states to these initial data. The novel, non-local resolution of the identity in terms of Cauchy coherent states is provided using frame theory. It is also shown that Perelomov coherent states for the Eucliean E(2) group have a simple and natural physical realization in these waveguide arrays.
format Preprint
id arxiv_https___arxiv_org_abs_2112_00872
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Coherent States for infinite homogeneous waveguide arrays: Cauchy coherent states for $E(2)$
Guerrero, Julio
López-Ruiz, Francisco F.
Quantum Physics
Mathematical Physics
Perelomov coherent states for equally spaced, infinite homogeneous waveguide arrays with Euclidean E(2) symmetry are defined, and a new resolution of the identity is obtained. The key point to construct this novel resolution of the identity is the fact that coherent states satisfy the Helmholtz equation (in coherent states labels), and thus every coherent state belongs to a one-parameter family uniquely determined by the Cauchy initial data of the coherent state in a one-dimensional Cauchy set. For this reason we call \textit{Cauchy coherent} states to these initial data. The novel, non-local resolution of the identity in terms of Cauchy coherent states is provided using frame theory. It is also shown that Perelomov coherent states for the Eucliean E(2) group have a simple and natural physical realization in these waveguide arrays.
title Coherent States for infinite homogeneous waveguide arrays: Cauchy coherent states for $E(2)$
topic Quantum Physics
Mathematical Physics
url https://arxiv.org/abs/2112.00872