We review lattice results related to pion, kaon, D-meson, B-meson, and nucleon physics with
the aim of making them easily accessible to the nuclear and particle physics communities …

We review lattice results related to pion, kaon, D-and B-meson physics with the aim of
making them easily accessible to the particle-physics community. More specifically, we …

We generalize the recently discovered relationship between JT gravity and double-scaled
random matrix theory to the case that the boundary theory may have time-reversal symmetry …

We perform a systematic symmetry classification of many-body Lindblad superoperators
describing general (interacting) open quantum systems coupled to a Markovian …

We show that topologically protected defect states can exist in open (leaky or lossy) systems
even when these systems are topologically trivial in the closed limit. The states appear from …

Normal-conducting mesoscopic systems in contact with a superconductor are classified by
the symmetry operations of time reversal and rotation of the electron's spin. Four symmetry …

The physics of Anderson transitions between localized and metallic phases in disordered
systems is reviewed. The term “Anderson transition” is understood in a broad sense …

A bstract A key issue in both the field of quantum chaos and quantum gravity is an effective
description of chaotic conformal field theories (CFTs), that is CFTs that have a quantum …

Spectral correlations are a powerful tool to study the dynamics of quantum many-body
systems. For Hermitian Hamiltonians, quantum chaotic motion is related to random matrix …

The theory of random matrices originated half a century ago as a universal description of the
spectral statistics of atoms and nuclei, dependent only on the presence or absence of …