Suppression of finite-size effects in one-dimensional correlated systems

Abstract

We investigate the effect of a non-uniform deformation applied to one-dimensional (1D) quantum systems, where the local energy scale is proportional to gj = [ (j π / N)]m determined by a positive integer m, site index 1 ≤ j ≤ N-1, and the system size N. This deformation introduces a smooth boundary to systems with open boundary conditions. When m ≥ 2, the leading 1/N correction to the ground state energy per bond e0(N) vanishes and one is left with a 1/N2 correction, the same as with periodic boundary conditions. In particular, when m = 2, the value of e0(N) obtained from the deformed open-boundary system coincides with the uniform system with periodic boundary conditions. We confirm the fact numerically for correlated systems, such as the extended Hubbard model, in addition to 1D free-Fermion models.