Quantum phase transition of (1+1)-dimensional O(3) nonlinear sigma model at finite density with tensor renormalization group

TL;DR

This paper investigates the quantum phase transition in a (1+1)-dimensional O(3) nonlinear sigma model at finite density using tensor renormalization group, overcoming the sign problem to determine critical properties.

Contribution

It applies tensor renormalization group to study the phase transition at finite density, extracting critical points and exponents in a sign-problematic model.

Findings

Identified the critical chemical potential $$ for the phase transition.

Determined the critical exponent $ u$ from the density dependence.

Extracted the dynamical critical exponent $z$ from correlation length scaling.

Abstract

We study the quantum phase transition of the (1+1)-dimensional O(3) nonlinear sigma model at finite density using the tensor renormalization group method. This model suffers from the sign problem, which has prevented us from investigating the properties of the phase transition. We investigate the properties of the phase transition by changing the chemical potential $\mu$ at a fixed coupling of $\beta$. We determine the transition point $\mu_{\rm c}$ and the critical exponent $\nu$ from the $\mu$ dependence of the number density in the thermodynamic limit. The dynamical critical exponent $z$ is also extracted from the scaling behavior of the temporal correlation length as a function of $\mu$.