Coupled First-Order Transitions In A Fermi-Bose Mixture

Abstract

A model of a mixture of spinless fermions and spin-zero hardcore bosons, with filling fractions F and B, respectively, on a two-dimensional square lattice with composite hopping t is presented. In this model, hopping swaps the locations of a fermion and a boson at nearest-neighbor sites. When F+B=1, the fermion hopping amplitude φ and boson superfluid amplitude are calculated in the ground state within a mean-field approximation. The Fermi sector is insulating (φ=0) and the Bose sector is normal (=0) for 0 F < c. The model has coupled first-order transitions at F = c 0.3 where both φ and are discontinuous. The Fermi sector is metallic (φ>0) and the Bose sector is superfluid (>0) for c < F < 1. At F=1/2, fermion density of states has a van Hove singularity, the bulk modulus displays a cusp-like singularity, the system has a density wave (DW) order, and φ and are maximum. At F= 0.81, vanishes, becoming negative for <F<1. The role of composite hopping in the evolution of Fermi band dispersions and Fermi surfaces as a function of F is highlighted. The estimate for BEC critical temperature is in the subkelvin range for ultracold atom systems and several hundred kelvins for possible solid-state examples of the model.