The square lattice Ising model on the rectangle I: Finite systems

Abstract

The partition function of the square lattice Ising model on the rectangle with open boundary conditions in both directions is calculated exactly for arbitrary system size L× M and temperature. We start with the dimer method of Kasteleyn, McCoy & Wu, construct a highly symmetric block transfer matrix and derive a factorization of the involved determinant, effectively decomposing the free energy of the system into two parts, F(L,M)=Fstrip(L,M)+Fstripres(L,M), where the residual part Fstripres(L,M) contains the nontrivial finite-L contributions for fixed M. It is given by the determinant of a M2× M2 matrix and can be mapped onto an effective spin model with M Ising spins and long-range interactions. While Fstripres(L,M) becomes exponentially small for large L/M or off-critical temperatures, it leads to important finite-size effects such as the critical Casimir force near criticality. The relations to the Casimir potential and the Casimir force are discussed.