Related papers: Irreducible matrix representations for the walled Brauer algebra

Irreducible matrix representations for the walled Brauer algebra

URL: http://arxiv.org/abs/2501.13067v1
Date: Wed, 22 Jan 2025 18:22:20 GMT
Title: Irreducible matrix representations for the walled Brauer algebra
Authors: Michał Studziński, Tomasz Młynik, Marek Mozrzymas, Michał Horodecki,
Abstract summary: This paper investigates the representation theory of the algebra of partially transposed permutation operators, $mathcalAd_p,p$. It provides a matrix representation for the abstract walled Brauer algebra. This algebra has recently gained significant attention due to its relevance in quantum information theory.
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Abstract: This paper investigates the representation theory of the algebra of partially transposed permutation operators, $\mathcal{A}^d_{p,p}$, which provides a matrix representation for the abstract walled Brauer algebra. This algebra has recently gained significant attention due to its relevance in quantum information theory, particularly in the efficient quantum circuit implementation of the mixed Schur-Weyl transform. In contrast to previous Gelfand-Tsetlin type approaches, our main technical contribution is the explicit construction of irreducible matrix units in the second-highest ideal that are group-adapted to the action of $\mathbb{C}[\mathcal{S}_p]\times \mathbb{C}[\mathcal{S}_p]$ subalgebra, where $\mathcal{S}_p$ is the symmetric group. This approach suggests a recursive method for constructing irreducible matrix units in the remaining ideals of the algebra. The framework is general and applies to systems with arbitrary numbers of components and local dimensions. The obtained results are applied to a special class of operators motivated by the mathematical formalism appearing in all variants of the port-based teleportation protocols through the mixed Schur-Weyl duality. We demonstrate that the given irreducible matrix units are, in fact, eigenoperators for the considered class.

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