Critical curve of loop percolation on the d-regular tree

Abstract

We consider clusters formed by a Poisson ensemble of random walk loops on the d-regular tree with an intensity parameter α>0 and a killing parameter κ>-1; the latter penalizes (κ> 0) or favors (κ<0) the appearance of large loops. We obtain an implicit formula for the critical curve κ αc(κ) for the percolation phase transition; the curve is positive if and only if κ>κc = 2d-1d-1, differentiable away from κc, and has order κ-κc as κκc and order (1+κ)2 as κ∞. We show that for each κ>-1, an infinite cluster exists exactly when α>αc(κ). Finally, we identify the near-critical behavior of the susceptibility and the percolation probability: for κ>κc, the critical exponents take the mean-field values, while for κ=κc, the phase transition is of a higher order with the percolation probability decaying quadratically in α-αc.