Litcius/Paper detail

Slow Many-Body Delocalization beyond One Dimension

Elmer V. H. Doggen, I. V. Gornyi, A. D. Mirlin, D. G. Polyakov

2020Physical Review Letters61 citationsDOIOpen Access PDF

Abstract

We study the delocalization dynamics of interacting disordered hard-core bosons for quasi-1D and 2D geometries, with system sizes and timescales comparable to state-of-the-art experiments. The results are strikingly similar to the 1D case, with slow, subdiffusive dynamics featuring power-law decay. From the freezing of this decay we infer the critical disorder W_{c}(L,d) as a function of length L and width d. In the quasi-1D case W_{c} has a finite large-L limit at fixed d, which increases strongly with d. In the 2D case W_{c}(L,L) grows with L. The results are consistent with the avalanche picture of the many-body localization transition.

Topics & Concepts

Dimension (graph theory)Delocalized electronPhysicsTheoretical physicsStatistical physicsQuantum mechanicsCombinatoricsMathematicsQuantum many-body systemsQuantum and electron transport phenomenaQuantum Computing Algorithms and Architecture