Abstract :
We present exact calculations of the partition function of the q-state Potts model for general q and temperature on strips of the square lattice of width Ly=3 vertices and arbitrary length Lx with periodic longitudinal boundary conditions, of the following types: (i) (FBCy, PBCx) = cyclic, (ii) (FBCy,TPBCx) = Möbius, (iii) (PBCy,PBCx) = toroidal, and (iv) (PBCy,TPBCx) = Klein bottle, where FBC and (T)PBC refer to free and (twisted) periodic boundary conditions. Results for the Ly=2 torus and Klein bottle strips are also included. In the infinite-length limit the thermodynamic properties are discussed and some general results are given for low-temperature behavior on strips of arbitrarily great width. We determine the submanifold in the space of q and temperature where the free energy is singular for these strips. Our calculations are also used to compute certain quantities of graph-theoretic interest
