Related papers: Hilbert space geometry and quantum chaos

Hilbert space geometry and quantum chaos

URL: http://arxiv.org/abs/2411.11968v1
Date: Mon, 18 Nov 2024 19:00:17 GMT
Title: Hilbert space geometry and quantum chaos
Authors: Rustem Sharipov, Anastasiia Tiutiakina, Alexander Gorsky, Vladimir Gritsev, Anatoli Polkovnikov,
Abstract summary: We consider the symmetric part of the QGT for various multi-parametric random matrix Hamiltonians. We find for a two-dimensional parameter space that, while the ergodic phase corresponds to the smooth manifold, the integrable limit marks itself as a singular geometry with a conical defect.
Score: 39.58317527488534
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Abstract: The quantum geometric tensor (QGT) characterizes the Hilbert space geometry of the eigenstates of a parameter-dependent Hamiltonian. In recent years, the QGT and related quantities have found extensive theoretical and experimental utility, in particular for quantifying quantum phase transitions both at and out of equilibrium. Here we consider the symmetric part (quantum Riemannian metric) of the QGT for various multi-parametric random matrix Hamiltonians and discuss the possible indication of ergodic or integrable behaviour. We found for a two-dimensional parameter space that, while the ergodic phase corresponds to the smooth manifold, the integrable limit marks itself as a singular geometry with a conical defect. Our study thus provides more support for the idea that the landscape of the parameter space yields information on the ergodic-nonergodic transition in complex quantum systems, including the intermediate phase.

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