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Autori principali: Koukoutsis, Efstratios, Papagiannis, Panagiotis, Hizanidis, Kyriakos, Ram, Abhay K., Vahala, George, Amaro, Oscar, Gamiz, Lucas I Inigo, Vallis, Dimosthenis
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2410.22505
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author Koukoutsis, Efstratios
Papagiannis, Panagiotis
Hizanidis, Kyriakos
Ram, Abhay K.
Vahala, George
Amaro, Oscar
Gamiz, Lucas I Inigo
Vallis, Dimosthenis
author_facet Koukoutsis, Efstratios
Papagiannis, Panagiotis
Hizanidis, Kyriakos
Ram, Abhay K.
Vahala, George
Amaro, Oscar
Gamiz, Lucas I Inigo
Vallis, Dimosthenis
contents Motivated by the contemporary advances in quantum implementation of non-unitary operations, we propose a new dilation method based on the biorthogonal representation of the non-unitary operator, mapping it to an isomorphic unitary matrix in the orthonormal computational basis. The proposed method excels in implementing non-unitary operators whose eigenvalues have absolute values exceeding one, when compared to other dilation and decomposition techniques. Unlike the Linear Combination of Unitaries (LCU) method, which becomes less efficient as the number of unitary summands grows, the proposed technique is optimal for small-dimensional non-unitary operators regardless of the number of unitary summands. Thus, it can complement the LCU method for implementing general non-unitary operators arising in positive only open quantum systems and pseudo-Hermitian systems.
format Preprint
id arxiv_https___arxiv_org_abs_2410_22505
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Quantum implementation of non-unitary operations with biorthogonal representations
Koukoutsis, Efstratios
Papagiannis, Panagiotis
Hizanidis, Kyriakos
Ram, Abhay K.
Vahala, George
Amaro, Oscar
Gamiz, Lucas I Inigo
Vallis, Dimosthenis
Quantum Physics
Motivated by the contemporary advances in quantum implementation of non-unitary operations, we propose a new dilation method based on the biorthogonal representation of the non-unitary operator, mapping it to an isomorphic unitary matrix in the orthonormal computational basis. The proposed method excels in implementing non-unitary operators whose eigenvalues have absolute values exceeding one, when compared to other dilation and decomposition techniques. Unlike the Linear Combination of Unitaries (LCU) method, which becomes less efficient as the number of unitary summands grows, the proposed technique is optimal for small-dimensional non-unitary operators regardless of the number of unitary summands. Thus, it can complement the LCU method for implementing general non-unitary operators arising in positive only open quantum systems and pseudo-Hermitian systems.
title Quantum implementation of non-unitary operations with biorthogonal representations
topic Quantum Physics
url https://arxiv.org/abs/2410.22505