Lattice ${\mathbb C} P^{N-1}$ model with ${\mathbb Z}_{N}$ twisted boundary condition: bions, adiabatic continuity and pseudo-entropy

TL;DR

This paper studies the ${ m C}P^{N-1}$ lattice sigma model with twisted boundary conditions, revealing the persistence of certain topological features and symmetry properties across different coupling regimes, indicating adiabatic continuity.

Contribution

It demonstrates the existence of fractional instantons and bions in the lattice model and shows the absence of a phase transition between large and small coupling regions.

Findings

Polyakov loop remains near zero across couplings.

Distribution forms an N-sided polygon indicating fractional instantons.

Pseudo-entropy density suggests no phase transition.

Abstract

We investigate the lattice ${\mathbb C} P^{N-1}$ sigma model on $S_{s}^{1}$(large) $\times$ $S_{\tau}^{1}$(small) with the ${\mathbb Z}_{N}$ symmetric twisted boundary condition, where a sufficiently large ratio of the circumferences ($L_{s}\gg L_{\tau}$) is taken to approximate ${\mathbb R} \times S^1$. We find that the expectation value of the Polyakov loop, which is an order parameter of the ${\mathbb Z}_N$ symmetry, remains consistent with zero ($|\langle P\rangle|\sim 0$) from small to relatively large inverse coupling $\beta$ (from large to small $L_{\tau}$). As $\beta$ increases, the distribution of the Polyakov loop on the complex plane, which concentrates around the origin for small $\beta$, isotropically spreads and forms a regular $N$-sided-polygon shape (e.g. pentagon for $N=5$), leading to $|\langle P\rangle| \sim 0$. By investigating the dependence of the Polyakov loop on $S_{s}^{1}$ direction, we also verify the existence of fractional instantons and bions, which cause tunneling transition between the classical $N$ vacua and stabilize the ${\mathbb Z}_{N}$ symmetry. Even for quite high $\beta$, we find that a regular-polygon shape of the Polyakov-loop distribution, even if it is broken, tends to be restored and $|\langle P\rangle|$ gets smaller as the number of samples increases. To discuss the adiabatic continuity of the vacuum structure from another viewpoint, we calculate the $\beta$ dependence of ``pseudo-entropy" density $\propto\langle T_{xx}-T_{\tau\tau}\rangle$. The result is consistent with the absence of a phase transition between large and small $\beta$ regions.