The continuous-time lace expansion

Abstract

We derive a continuous-time lace expansion for a broad class of self-interacting continuous-time random walks. Our expansion applies when the self-interaction is a sufficiently nice function of the local time of a continuous-time random walk. As a special case we obtain a continuous-time lace expansion for a class of spin systems that admit continuous-time random walk representations. We apply our lace expansion to the n-component g||4 model on Zd when n=1,2, and prove that the critical Green's function G_c(x) is asymptotically a multiple of |x|2-d when d≥ 5 at weak coupling. As another application of our method we establish the analogous result for the lattice Edwards model at weak coupling.