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Longest weakly increasing subsequences of discrete random walks on the integers with heavy tailed distribution of increments

Author

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  • Mendonça, José Ricardo G.
  • Freire, Marcelo V.

Abstract

We investigate the behavior of the length of the longest weakly increasing subsequences (weak LIS) of n-step random walks with nonzero integer increments k=±1,±2,… given by a symmetric heavy tailed mass distribution proportional to |k|−1−α for several values of the real parameter α>0 together with that of the simple random walk (k=±1), to which the n-step heavy tailed walks reduce when α grows large enough that step jumps beyond ±1 become essentially absent on the scale of n. By means of exploratory fits, weighted nonlinear least squares, and nested-model comparisons, we found that the sample average length 〈Ln〉 scales like 〈Ln〉∼nlogn when the distribution of increments has finite variance (α>2) and 〈Ln〉∼nθ with a varying exponent θ>0.5 when the variance is infinite (α≤2). Distributional diagnostics indicate that the bulk of the Ln distribution is very well-approximated by a lognormal model, though systematic deviations are observed in the tails. Our results corroborate and expand upon previous results for the LIS of other types of heavy-tailed random walks and raise a conjecture as to whether the distribution of Ln is given, or can be effectively described, by a lognormal distribution.

Suggested Citation

  • Mendonça, José Ricardo G. & Freire, Marcelo V., 2026. "Longest weakly increasing subsequences of discrete random walks on the integers with heavy tailed distribution of increments," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 697(C).
  • Handle: RePEc:eee:phsmap:v:697:y:2026:i:c:s0378437126004681
    DOI: 10.1016/j.physa.2026.131732
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