Related papers: Multi-invariants in stabilizer states

Multi-invariants in stabilizer states

URL: http://arxiv.org/abs/2601.16258v1
Date: Thu, 22 Jan 2026 19:00:02 GMT
Title: Multi-invariants in stabilizer states
Authors: Sriram Akella, Abhijit Gadde, Jay Pandey,
Abstract summary: We develop tools to calculate a class of multipartite entanglement measures for stabilizer states.<n>We uncover hints of an interesting connection between multi-invariants, stabilizer states and topology.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Multipartite entanglement is a natural generalization of bipartite entanglement, but is relatively poorly understood. In this paper, we develop tools to calculate a class of multipartite entanglement measures - known as multi-invariants - for stabilizer states. We give an efficient numerical algorithm that computes multi-invariants for stabilizer states. For tripartite stabilizer states, we also obtain an explicit formula for any multi-invariant using the GHZ-extraction theorem. We then present a counting argument that calculates any Coxeter multi-invariant of a q-partite stabilizer state. We conjecture a closed form expression for the same. We uncover hints of an interesting connection between multi-invariants, stabilizer states and topology. We show how our formulas are further simplified for a restricted class of stabilizer states that appear as ground states of interesting models like the toric code and the X-cube model.

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