Related papers: Entangled Subspaces through Algebraic Geometry

Entangled Subspaces through Algebraic Geometry

URL: http://arxiv.org/abs/2504.11525v1
Date: Tue, 15 Apr 2025 18:00:00 GMT
Title: Entangled Subspaces through Algebraic Geometry
Authors: Masoud Gharahi, Stefano Mancini,
Abstract summary: We propose an algebra-inspired approach for constructing entangled subspaces within the Hilbert space of a multipartite quantum system.<n>By utilizing this technique, we construct the minimal-dimensional, non-orthogonal yet Unextendible Product Basis (nUPB)<n>In multiqu systems, we determine the maximum achievable dimension of a symmetric GES and demonstrate its realization through this construction.
Score: 3.069335774032178
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We propose an algebraic geometry-inspired approach for constructing entangled subspaces within the Hilbert space of a multipartite quantum system. Specifically, our method employs a modified Veronese embedding, restricted to the conic, to define subspaces within the symmetric part of the Hilbert space. By utilizing this technique, we construct the minimal-dimensional, non-orthogonal yet Unextendible Product Basis (nUPB), enabling the decomposition of the multipartite Hilbert space into a two-dimensional subspace, complemented by a Genuinely Entangled Subspace (GES) and a maximal-dimensional Completely Entangled Subspace (CES). In multiqudit systems, we determine the maximum achievable dimension of a symmetric GES and demonstrate its realization through this construction. Furthermore, we systematically investigate the transition from the conventional Veronese embedding to the modified one by imposing various constraints on the affine coordinates, which, in turn, increases the CES dimension while reducing that of the GES.

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