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Autores principales: Martínez-Cifuentes, Javier, Quesada, Nicolás
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2603.05499
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author Martínez-Cifuentes, Javier
Quesada, Nicolás
author_facet Martínez-Cifuentes, Javier
Quesada, Nicolás
contents Continuous-variable quantum systems are central to quantum technologies, with Gaussian states playing a key role due to their broad applicability and simple description via first and second moments. Distinguishing Gaussian states requires computing their trace distance, but no analytical formula exists for general states, and numerical evaluation is difficult due to the exponential cost of representing infinite-dimensional operators. We introduce an efficient numerical method to compute the trace distance between a pure and a mixed Gaussian state, based on a generalized Lanczos algorithm that avoids explicit matrix representations and uses only moment information. The technique extends to non-Gaussian states expressible as linear combinations of Gaussian states. We also show how it can yield lower bounds on the trace distance between mixed Gaussian states, offering a practical tool for state certification and learning in continuous-variable quantum systems.
format Preprint
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institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Calculating trace distances of bosonic states in Krylov subspace
Martínez-Cifuentes, Javier
Quesada, Nicolás
Quantum Physics
Continuous-variable quantum systems are central to quantum technologies, with Gaussian states playing a key role due to their broad applicability and simple description via first and second moments. Distinguishing Gaussian states requires computing their trace distance, but no analytical formula exists for general states, and numerical evaluation is difficult due to the exponential cost of representing infinite-dimensional operators. We introduce an efficient numerical method to compute the trace distance between a pure and a mixed Gaussian state, based on a generalized Lanczos algorithm that avoids explicit matrix representations and uses only moment information. The technique extends to non-Gaussian states expressible as linear combinations of Gaussian states. We also show how it can yield lower bounds on the trace distance between mixed Gaussian states, offering a practical tool for state certification and learning in continuous-variable quantum systems.
title Calculating trace distances of bosonic states in Krylov subspace
topic Quantum Physics
url https://arxiv.org/abs/2603.05499