中文

Geodesics and Spanning Trees for Euclidean First-Passage Percolation

概率论 2007-05-23 v1 数学物理 math.MP

摘要

The metric Dα(q,q)D_\alpha (q,q') on the set QQ of particle locations of a homogeneous Poisson process on RdR^d, defined as the infimum of (iqiqi+1α)1/α(\sum_i |q_i - q_{i+1}|^\alpha)^{1/\alpha} over sequences in QQ starting with qq and ending with qq' (where .| . | denotes Euclidean distance) has nontrivial geodesics when α>1\alpha > 1. The cases 1<α<1 <\alpha < \infty are the Euclidean first-passage percolation (FPP) models introduced earlier by the authors while the geodesics in the case α=\alpha = \infty are exactly the paths from the Euclidean minimal spanning trees/forests of Aldous and Steele. We compare and contrast results and conjectures for these two situations. New results for 1<α<1 < \alpha < \infty (and any dd) include inequalities on the fluctuation exponents for the metric (χ1/2\chi \le 1/2) and for the geodesics (ξ3/4\xi \le 3/4) in strong enough versions to yield conclusions not yet obtained for lattice FPP: almost surely, every semi-infinite geodesic has an asymptotic direction and every direction has a semi-infinite geodesic (from every qq). For d=2d=2 and 2leα<2 le \alpha < \infty, further results follow concerning spanning trees of semi-infinite geodesics and related random surfaces.

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引用

@article{arxiv.math/0010205,
  title  = {Geodesics and Spanning Trees for Euclidean First-Passage Percolation},
  author = {C. D. Howard and C. M. Newman},
  journal= {arXiv preprint arXiv:math/0010205},
  year   = {2007}
}

备注

63 pages, one figure; to appear in Ann. Probability