Coefficients of bosonized dimer operators in spin-1/2 XXZ chains and their applications

Abstract

Comparing numerically evaluated excitation gaps of dimerized spin-1/2 XXZ chains with the gap formula for the low-energy effective sine-Gordon theory, we determine coefficients dxy and dz of bosonized dimerization operators in spin-1/2 XXZ chains, which are defined as (-1)j(Sxj Sxj+1 +Syj Syj+1) = dxy sin(4piphi(x))+ ... and (-1)j Szj Szj+1 = dz sin(sqrt4piphi(x)) + .... We also calculate the coefficients of both spin and dimer operators for the spin-1/2 Heisenberg antiferromagnetic chain with a nearest-neighbor coupling J and a next-nearest-neighbor coupling J2 = 0.2411J. As applications of these coefficients, we present ground-state phase diagrams of dimerized spin chains in a magnetic field and antiferromagnetic spin ladders with a four-spin interaction. The optical conductivity and electric polarization of one-dimensional Mott insulators with Peierls instability are also evaluated quantitatively.