Expansion in n-1 for percolation critical values on the n-cube and Zn: the first three terms

Abstract

Let pc(Qn) and pc(Zn) denote the critical values for nearest-neighbour bond percolation on the n-cube Qn = \0,1\n and on n, respectively. Let = n for G = Qn and = 2n for G = Zn denote the degree of G. We use the lace expansion to prove that for both G = Qn and G = Zn, pc(G) & = -1 + -2 + 7/2 -3 + O(-4). This extends by two terms the result pc(Qn) = -1 + O(-2) of Borgs, Chayes, van der Hofstad, Slade and Spencer, and provides a simplified proof of a previous result of Hara and Slade for Zn.

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