Exponential decay of correlations at high temperature in H2|2n nonlinear sigma models
Abstract
We consider a family of nonlinear sigma models on Zd whose target space is the hyperbolic super manifold H2|2n, n >1, introduced by Crawford as an extension of Zirnbauer's H2|2 model for disordered systems. We prove exponential decay of the two-point correlation function in the high-temperature regime β ≤ C n-1, with C>0 a universal constant, for any n>1 and any dimension d≥ 1, with mass β-1. We also consider models with long-range interaction and prove fast decay in the same high-temperature regime. The proof is based on the reduction to a marginal fermionic theory and combines a high-temperature cluster expansion, exact combinatorics and bounds derived via Grassmann norms.
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