Local unitarty equivalence and entanglement by Bargmann invariants
- URL: http://arxiv.org/abs/2412.17237v1
- Date: Mon, 23 Dec 2024 03:15:51 GMT
- Title: Local unitarty equivalence and entanglement by Bargmann invariants
- Authors: Lin Zhang, Bing Xie, Yuanhong Tao,
- Abstract summary: Local unitary equivalence holds significant importance in quantum state classification and resource theory.
This paper focuses on the fundamental issue of local unitary equivalence for multipartite quantum states within quantum information theory.
The research delves into the characterization of local unitary equivalence and the detection of entanglement using local unitary Bargmann invariants.
- Score: 5.0818131576227525
- License:
- Abstract: The study of quantum states frequently examines the connection between non-local effects in quantum mechanics and quantities that remain unchanged under local unitary transformations. Among these concepts, local unitary equivalence, defined through local unitary transformations, holds significant importance in quantum state classification and resource theory. This paper focuses on the fundamental issue of local unitary equivalence for multipartite quantum states within quantum information theory, with the aim of identifying the comprehensive set of invariants that define their local unitary orbits. These invariants are crucial for deriving polynomial invariants and describing physical properties that remain invariant under local unitary transformations. Specifically, the research delves into the characterization of local unitary equivalence and the detection of entanglement using local unitary Bargmann invariants, utilizing the generalized Schur-Weyl duality to analyze tensor product symmetries. Taking the two-qubit system as an example, our study demonstrates the measurability of the invariants that determine local unitary equivalence and establishes a relationship between Makhlin's fundamental invariants (a complete set of 18 local unitary invariants for two-qubit states) and local unitary Bargmann invariants. These Bargmann invariants are related to the trace of density operator products with marginal states and can be measured through a cycle test, an extension of the SWAP test.These findings offer a practical criterion for entanglement detection based on local unitary Bargmann invariants, contributing to the advancement of quantum information theory and its applications.
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