Monotonicity of Ursell functions in the Ising model
Abstract
In this paper, we consider Ising models with ferromagnetic pair interactions. We prove that the Ursell functions u2k satisfy: (-1)k-1u2k is increasing in each interaction. As an application, we prove a 1983 conjecture by Nishimori and Griffiths about the partition function of the Ising model with complex external field h: its closest zero to the origin (in the variable h) moves towards the origin as an arbitrary interaction increases.
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