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Autore principale: Gnatenko, Kh. P.
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2408.01511
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author Gnatenko, Kh. P.
author_facet Gnatenko, Kh. P.
contents Quantum states of spin systems that can be represented with weighted graphs $G(V, E)$ are studied. The geometrical characteristics of these states are examined. We find that the velocity of quantum evolution is determined by the sum of the weighted degrees of the nodes in the graph, constructed by raising to the second power the weights in $G(V, E)$. The curvature depends on the sum of the weighted degrees of nodes in graphs constructed by raising the weights in $G(V, E)$ to the second and fourth powers. It also depends on the sum of the products of the weights of edges forming squares in graph $G(V, E)$. The torsion in addition is related to the sum of the products of the weights of edges in graph $G(V, E)$ forming triangles $S_3$. Geometric properties of quantum graph states and the sum of the weighted degrees of nodes have been calculated with quantum programming on IBM's quantum computer for the case of a spin chain.
format Preprint
id arxiv_https___arxiv_org_abs_2408_01511
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Relation of curvature and torsion of weighted graph states with graph properties and its studies on a quantum computer
Gnatenko, Kh. P.
Quantum Physics
Quantum states of spin systems that can be represented with weighted graphs $G(V, E)$ are studied. The geometrical characteristics of these states are examined. We find that the velocity of quantum evolution is determined by the sum of the weighted degrees of the nodes in the graph, constructed by raising to the second power the weights in $G(V, E)$. The curvature depends on the sum of the weighted degrees of nodes in graphs constructed by raising the weights in $G(V, E)$ to the second and fourth powers. It also depends on the sum of the products of the weights of edges forming squares in graph $G(V, E)$. The torsion in addition is related to the sum of the products of the weights of edges in graph $G(V, E)$ forming triangles $S_3$. Geometric properties of quantum graph states and the sum of the weighted degrees of nodes have been calculated with quantum programming on IBM's quantum computer for the case of a spin chain.
title Relation of curvature and torsion of weighted graph states with graph properties and its studies on a quantum computer
topic Quantum Physics
url https://arxiv.org/abs/2408.01511