Phase coexistence of gradient Gibbs states
Abstract
We consider the (scalar) gradient fields η=(ηb)--with b denoting the nearest-neighbor edges in 2--that are distributed according to the Gibbs measure proportional to -β H(η)(η). Here H=ΣbV(ηb) is the Hamiltonian, V is a symmetric potential, β>0 is the inverse temperature, and is the Lebesgue measure on the linear space defined by imposing the loop condition ηb1+ηb2=ηb3+ηb4 for each plaquette (b1,b2,b3,b4) in 2. For convex V, Funaki and Spohn have shown that ergodic infinite-volume Gibbs measures are characterized by their tilt. We describe a mechanism by which the gradient Gibbs measures with non-convex V undergo a structural, order-disorder phase transition at some intermediate value of inverse temperature β. At the transition point, there are at least two distinct gradient measures with zero tilt, i.e., E ηb=0.
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