A general approach to massive upper bound for two-point function with application to self-avoiding walk torus plateau
Abstract
We prove a sufficient condition for the two-point function of a statistical mechanical model on Zd, d > 2, to be bounded uniformly near a critical point by |x|-(d-2) [ -c|x| / ], where is the correlation length. The condition is given in terms of a convolution equation satisfied by the two-point function, and we verify the condition for strictly self-avoiding walk in dimensions d > 4 using the lace expansion. As an example application, we use the uniform bound to study the self-avoiding walk on a d-dimensional discrete torus with d > 4, proving a ``plateau'' of the torus two-point function, a result previously obtained for weakly self-avoiding walk in dimensions d > 4 by Slade. Our method has the potential to be applied to other statistical mechanical models on Zd or on the torus.
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