Finite-size scaling at a topological transition: Bilinear-biquadratic spin-1 chain | |
Article | |
关键词: ISOTROPIC HEISENBERG CHAIN; RENORMALIZATION-GROUP; ARBITRARY SPINS; FIELD-THEORY; | |
DOI : 10.1103/PhysRevB.101.235145 | |
来源: SCIE |
【 摘 要 】
We consider a finite-size scaling function across a topological phase transition in one-dimensional models. For models of noninteracting fermions it was shown to be universal for all topological symmetry classes and markedly asymmetric between trivial and topological sides of the transition [T. Gulden, M. Janas, Y. Wang, and A. Kamenev, Phys. Rev. Lett. 116, 026402 (2016)]. Here we verify its universality for the topological transition between dimerized and Haldane phases in bilinear-biquadratic spin-1 chain. To this end we perform high-accuracy variational matrix product state simulations. We show that the scaling function, expressed in terms of L/xi, where L is the chain length and xi is the correlation length, coincides with that of three species of noninteracting massive Majorana fermions. The latter is known to be a proper description of the conformal critical theory with central charge c = 3/2. We have shown that it still holds away from the conformal point, including the finite-size corrections. We have also observed peculiar differences between even- and odd-size chains, which may be fully accounted for by residual interactions of the edge states.
【 授权许可】
Free