Statistics of Largest Loops in a Random Walk

Abstract

We report further findings on the size distribution of the largest neutral segments in a sequence of N randomly charged monomers [D. Ertas and Y. Kantor, Phys. Rev. E53, 846 (1996); cond-mat/9507005]. Upon mapping to one--dimensional random walks (RWs), this corresponds to finding the probability distribution for the size L of the largest segment that returns to its starting position in an N--step RW. We primarily focus on the large N, = L/N << 1 limit, which exhibits an essential singularity. We establish analytical upper and lower bounds on the probability distribution, and numerically probe the distribution down to ≈ 0.04 (corresponding to probabilities as low as 10-15) using a recursive Monte Carlo algorithm. We also investigate the possibility of singularities at =1/k for integer k.

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