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Random matrix spectral form factor in kicked interacting fermionic chains

Dibyendu Roy, Tomaž Prosen

2020Physical review. E48 citationsDOIOpen Access PDF

Abstract

We study quantum chaos and spectral correlations in periodically driven (Floquet) fermionic chains with long-range two-particle interactions, in the presence and absence of particle-number conservation [U(1)] symmetry. We analytically show that the spectral form factor precisely follows the prediction of random matrix theory in the regime of long chains, and for timescales that exceed the so-called Thouless time which scales with the size L as O(L^{2}), or O(L^{0}), in the presence, or absence, of U(1) symmetry, respectively. Using a random phase assumption which essentially requires a long-range nature of the interaction, we demonstrate that the Thouless time scaling is equivalent to the behavior of the spectral gap of a classical Markov chain, which is in the continuous-time (Trotter) limit generated, respectively, by a gapless XXX, or gapped XXZ, spin-1/2 chain Hamiltonian.

Topics & Concepts

Matrix (chemical analysis)Random matrixPhysicsFactor (programming language)Mathematical physicsQuantum mechanicsComputer scienceEigenvalues and eigenvectorsMaterials scienceComposite materialProgramming languageQuantum chaos and dynamical systemsCold Atom Physics and Bose-Einstein CondensatesQuantum many-body systems