Related papers: Characterizing quantum resourcefulness via group-Fourier decompositions

Characterizing quantum resourcefulness via group-Fourier decompositions

URL: http://arxiv.org/abs/2506.19696v1
Date: Tue, 24 Jun 2025 15:02:40 GMT
Title: Characterizing quantum resourcefulness via group-Fourier decompositions
Authors: Pablo Bermejo, Paolo Braccia, Antonio Anna Mele, Nahuel L. Diaz, Andrew E. Deneris, Martin Larocca, M. Cerezo,
Abstract summary: We argue that the group Fourier decompositions (GFDs) of a state constitute fingerprints of resourcefulness and complexity.<n>We find that low-resource states live in the small dimensional irreps of operator space, whereas high-resource states have support in more, and higher dimensional ones.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In this work we present a general framework for studying the resourcefulness in pure states for quantum resource theories (QRTs) whose free operations arise from the unitary representation of a group. We argue that the group Fourier decompositions (GFDs) of a state, i.e., its projection onto the irreducible representations (irreps) of the Hilbert space, operator space, and tensor products thereof, constitute fingerprints of resourcefulness and complexity. By focusing on the norm of the irrep projections, dubbed GFD purities, we find that low-resource states live in the small dimensional irreps of operator space, whereas high-resource states have support in more, and higher dimensional ones. Such behavior not only resembles that appearing in classical harmonic analysis, but is also universal across the QRTs of entanglement, fermionic Gaussianity, spin coherence, and Clifford stabilizerness. To finish, we show that GFD purities carry operational meaning as they lead to resourcefulness witnesses as well as to notions of state compressibility.

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