Related papers: Complex Wigner entropy and Fisher control of negativity in an oval quantum billiard

Complex Wigner entropy and Fisher control of negativity in an oval quantum billiard

URL: http://arxiv.org/abs/2512.03505v1
Date: Wed, 03 Dec 2025 06:54:58 GMT
Title: Complex Wigner entropy and Fisher control of negativity in an oval quantum billiard
Authors: Kyu-Won Park, Jongin Jeong,
Abstract summary: We apply Wigner negativity to avoided crossings in an oval quantum billiard.<n>For a real Wigner function the Gibbs-Shannon functional becomes complex.<n>A sign-resolved decomposition separates the total negative weight from its phase-space distribution.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We develop a complex-entropy framework for Wigner negativity and apply it to avoided crossings in an oval quantum billiard. For a real Wigner function the Gibbs--Shannon functional becomes complex; its imaginary part, proportional to the Wigner-negative volume, serves as an entropy-like measure of phase-space nonclassicality. A sign-resolved decomposition separates the total negative weight from its phase-space distribution and defines a negative-channel Fisher information that quantifies how sensitively the negative lobe reshapes as a control parameter is varied. This structure yields a Cauchy--Schwarz bound that limits how rapidly the imaginary entropy, and hence the Wigner negativity, can change with the parameter. In the oval billiard, avoided crossings display enhanced negativity and an amplified negative-channel Fisher response, providing a clear phase-space signature of mode hybridization. The construction is generic and extends to other wave-chaotic and mesoscopic systems with phase-space representations.

Related papers

Symmetry-protected topology and deconfined solitons in a multi-link $\mathbb{Z}_2$ gauge theory [45.88028371034407]
We study a $mathbbZ$ lattice gauge theory defined on a multi-graph with links that can be visualized as great circles of a spherical shell.<n>We show that this leads to state-dependent tunneling amplitudes underlying a phenomenon analogous to the Peierls instability.<n>By performining a detailed analysis based on matrix product states, we prove that charge deconfinement emerges as a consequence of charge-fractionalization.
arXiv Detail & Related papers (2026-03-02T22:59:25Z)
MirrorLA: Reflecting Feature Map for Vision Linear Attention [49.41670925034762]
Linear attention significantly reduces the computational complexity of Transformers from quadratic to linear, yet it consistently lags behind softmax-based attention in performance.<n>We propose MirrorLA, a geometric framework that substitutes passive truncation with active reorientation.<n>MirrorLA achieves state-of-the-art performance across standard benchmarks, demonstrating that strictly linear efficiency can be achieved without compromising representational fidelity.
arXiv Detail & Related papers (2026-02-04T09:14:09Z)
On the stabilizer complexity of Hawking radiation [0.0]
We study the complexity of Hawking radiation for an evaporating black hole from the perspective of the stabilizer theory of quantum computation.<n>We first calculate the Wigner negativity of Hawking radiation in the PSSY model directly using the gravitational path integral.<n>We then study the Wigner negativity of radiation in a dynamical model of black hole evaporation.
arXiv Detail & Related papers (2025-10-21T18:00:04Z)
Topological crystals and soliton lattices in a Gross-Neveu model with Hilbert-space fragmentation [39.146761527401424]
We explore the finite-density phase diagram of the single-flavour Gross-Neveu-Wilson (GNW) model.<n>We find a sequence of inhomogeneous ground states that arise through a real-space version of the mechanism of Hilbert-space fragmentation.
arXiv Detail & Related papers (2025-06-23T14:19:35Z)
Measurement-induced Lévy flights of quantum information [35.31418199674737]
We explore a model of free fermions in one dimension subject to frustrated local measurements across adjacent sites.<n>For maximal misalignment, superdiffusive behavior emerges from the vanishing of the measurement-induced quasiparticle decay rate.<n>Our findings show how intricate fractal-scaling entanglement can be produced for local Hamiltonians.
arXiv Detail & Related papers (2025-01-22T14:29:13Z)
Measurement-induced transitions for interacting fermions [43.04146484262759]
We develop a field-theoretical framework that provides a unified approach to observables characterizing entanglement and charge fluctuations.<n>Within this framework, we derive a replicated Keldysh non-linear sigma model (NLSM)<n>By using the renormalization-group approach for the NLSM, we determine the phase diagram and the scaling of physical observables.
arXiv Detail & Related papers (2024-10-09T18:00:08Z)
Complex-valued Wigner entropy of a quantum state [0.0]
We argue the merits of defining a complex-valued entropy associated with any Wigner function. It is anticipated that the complex plane yields a proper framework for analyzing the entropic properties of quasiprobability distributions in phase space.
arXiv Detail & Related papers (2023-10-30T06:30:03Z)
Universal features of entanglement entropy in the honeycomb Hubbard model [44.99833362998488]
This paper introduces a new method to compute the R'enyi entanglement entropy in auxiliary-field quantum Monte Carlo simulations. We demonstrate the efficiency of this method by extracting, for the first time, universal subleading logarithmic terms in a two dimensional model of interacting fermions.
arXiv Detail & Related papers (2022-11-08T15:52:16Z)
Quantum critical behavior of entanglement in lattice bosons with cavity-mediated long-range interactions [0.0]
We analyze the ground-state entanglement entropy of the extended Bose-Hubbard model with infinite-range interactions. This model describes the low-energy dynamics of ultracold bosons tightly bound to an optical lattice and dispersively coupled to a cavity mode.
arXiv Detail & Related papers (2022-04-16T04:10:57Z)
Dynamics of charge-imbalance-resolved entanglement negativity after a quench in a free-fermion model [0.0]
We study the time evolution of charge-imbalance-resolved negativity after a global quench. We derive and conjecture a formula for the dynamics of the charged R'enyi logarithmic negativities.
arXiv Detail & Related papers (2022-02-10T20:25:24Z)
Quantification of Wigner Negativity Remotely Generated via Einstein-Podolsky-Rosen Steering [11.427047150248708]
Wigner negativity plays an essential role in quantum computing and simulation using continuous-variable systems. Motivated by the demand of real-world quantum network, here we investigate the shareability of generated Wigner negativity in the multipartite scenario. Our results pave the way for exploiting Wigner negativity as a valuable resource for numerous quantum information protocols based on non-Gaussian scenario.
arXiv Detail & Related papers (2021-04-01T13:07:54Z)

This list is automatically generated from the titles and abstracts of the papers in this site.