Theoretical scheme for finite-temperature dynamics of Kitaev’s spin liquids

Abstract

In this article, we review the theoretical formulation of finite temperature dynamics of Kitaev’s spin liquid. We present the exact analytical solution of the dynamical spin correlation function at the integrable limit of Kitaev’s model, on the basis of (2018 Phys. Rev. B 98 220404). By combining the analytical solution with the equilibrium classical Monte-Carlo scheme, we construct a formulation to access the finite temperature dynamics of Kitaev’s spin liquid exactly, with a reasonable amount of computational cost. This formulation is based on the real-time representation, which enables us to directly access the experimental observables defined in real frequency, without analytical continuation. The real-time scheme is essential to capturing the resonant features of the spectrum accurately, which occurs e.g. in the chiral spin liquid phase with isolated Majorana zero modes. Accordingly, this scheme provides an effective approach to address the nature of fractional excitations in Kitaev’s spin liquid. As an application, we address the detection of zero mode around the site vacancy through the local resonant spectrum and discuss how the character of Kitaev’s spin liquid emerges in its dynamical signature.