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On Chemical Distance and Local Uniqueness of a Sufficiently Supercritical Finitary Random Interlacements

Author

Listed:
  • Zhenhao Cai

    (Peking University)

  • Xiao Han

    (Peking University)

  • Jiayan Ye

    (Ben Gurion University of the Negev)

  • Yuan Zhang

    (Peking University)

Abstract

In this paper, we study geometric properties of the unique infinite cluster $$\Gamma ^{u,T}$$ Γ u , T in a sufficiently supercritical finitary random interlacements $$\mathcal {FI}^{u,T}$$ FI u , T in $${\mathbb {Z}}^d, \ d\ge 3$$ Z d , d ≥ 3 . We prove that the chemical distance in $$\Gamma ^{u,T}$$ Γ u , T is, with stretched exponentially high probability, of the same order as the Euclidean distance in $${\mathbb {Z}}^d$$ Z d . This also implies a shape theorem parallel to those for percolation and regular random interlacements. We also prove local uniqueness of $$\mathcal {FI}^{u,T}$$ FI u , T , which says that any two large clusters in $$\mathcal {FI}^{u,T}$$ FI u , T “close to each other" will be connected within the same order of their diameters except a stretched exponentially small probability.

Suggested Citation

  • Zhenhao Cai & Xiao Han & Jiayan Ye & Yuan Zhang, 2023. "On Chemical Distance and Local Uniqueness of a Sufficiently Supercritical Finitary Random Interlacements," Journal of Theoretical Probability, Springer, vol. 36(1), pages 522-592, March.
  • Handle: RePEc:spr:jotpro:v:36:y:2023:i:1:d:10.1007_s10959-022-01182-0
    DOI: 10.1007/s10959-022-01182-0
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