Two-dimensional critical systems with mixed boundary conditions: Exact Ising results from conformal invariance and boundary-operator expansions

Abstract

With conformal-invariance methods, Burkhardt, Guim, and Xue studied the critical Ising model, defined on the upper half plane y>0 with different boundary conditions a and b on the negative and positive x axes. For ab=-+ and f+, they determined the one and two-point averages of the spin σ and energy ε. Here +, -, and f stand for spin-up, spin-down, and free-spin boundaries, respectively. The case +-+-+…, where the boundary conditions switch between + and - at arbitrary points, ζ1, ζ2, … on the x axis was also analyzed. In this paper the alternating boundary conditions +f+f+… and the case -f+ of three different boundary conditions are considered. Exact results for the one and two-point averages of σ, ε, and the stress tensor T are derived. Using the results for T, the critical Casimir interaction with the boundary of a wedge-shaped inclusion is analyzed for mixed boundary conditions. The paper also includes a comprehensive discussion of boundary-operator expansions in two-dimensional critical systems with mixed boundary conditions. Two types of expansions - away from switching points of the boundary condition and at switching points - are considered. The asymptotic behavior of two-point averages is expressed in terms of one-point averages with the help of the expansions. We also consider the strip geometry with mixed boundary conditions and derive the distant-wall corrections to one-point averages near one edge due to the other edge using the boundary-operator expansions. The predictions of the boundary-operator expansions are consistent with exact results for Ising systems.