Litcius/Paper detail

Scale-Invariant Survival Probability at Eigenstate Transitions

Miroslav Hopjan, Lev Vidmar

2023Physical Review Letters25 citationsDOI

Abstract

Understanding quantum phase transitions in highly excited Hamiltonian eigenstates is currently far from being complete. It is particularly important to establish tools for their characterization in time domain. Here, we argue that a scaled survival probability, where time is measured in units of a typical Heisenberg time, exhibits a scale-invariant behavior at eigenstate transitions. We first demonstrate this property in two paradigmatic quadratic models, the one-dimensional Aubry-Andre model and three-dimensional Anderson model. Surprisingly, we then show that similar phenomenology emerges in the interacting avalanche model of ergodicity breaking phase transitions. This establishes an intriguing similarity between localization transition in quadratic systems and ergodicity breaking phase transition in interacting systems.

Topics & Concepts

PhysicsErgodicityScale invarianceEigenvalues and eigenvectorsStatistical physicsQuadratic equationPhase transitionInvariant (physics)Hamiltonian (control theory)Quantum phase transitionQuantum mechanicsMathematical physicsMathematicsMathematical optimizationGeometryQuantum many-body systemsOpinion Dynamics and Social InfluenceModel Reduction and Neural Networks