We report a careful finite size scaling study of the metal–insulator transition in Anderson's
model of localization. We focus on the estimation of the critical exponent ν that describes the …

Logarithmic operators and logarithmic conformal field theories are reviewed. Prominent
examples considered here include c=− 2 and c= 0 logarithmic conformal field theories. c= 0 …

We apply field theory methods to SU (3) chains in the symmetric representation, with p
boxes in the Young tableau, map** them into a flag manifold nonlinear σ-model with a …

This work presents a computational program based on the principles of non-commutative
geometry and showcases several applications to topological insulators. Noncommutative …

Two-dimensional (2D) Dirac fermions are a central paradigm of modern condensed matter
physics, describing low-energy excitations in graphene, in certain classes of …

Recently, the search for an axion insulator state in the ferromagnetic-3D topological
insulator (TI) heterostructure and MnBi 2 Te 4 has attracted intense interest. However, its …

The integer quantum Hall transition (IQHT) is one of the most mysterious members of the
family of Anderson transitions. Since the 1980s, the scaling behavior near the IQHT has …

Quantum Griffiths singularity (QGS) reveals the profound influence of quenched disorder on
the quantum phase transitions, characterized by the divergence of the dynamical critical …

In this paper we propose an S-matrix approach to numerical simulations of network models
and apply it to random networks that we proposed in a previous work [IA Gruzberg, A …

We present a numerical finite-size scaling study of the localization length in long cylinders
near the integer quantum Hall transition employing the Chalker-Coddington network model …