A limit field for orthogonal range searches in two-dimensional random point search trees

November 30, 2017 Β· Declared Dead Β· πŸ› Stochastic Processes and their Applications

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Authors Nicolas Broutin, Henning Sulzbach arXiv ID 1711.11354 Category math.PR Cross-listed cs.DS, math.CO Citations 0 Venue Stochastic Processes and their Applications Last Checked 4 months ago
Abstract
We consider the cost of general orthogonal range queries in random quadtrees. The cost of a given query is encoded into a (random) function of four variables which characterize the coordinates of two opposite corners of the query rectangle. We prove that, when suitably shifted and rescaled, the random cost function converges uniformly in probability towards a random field that is characterized as the unique solution to a distributional fixed-point equation. We also state similar results for $2$-d trees. Our results imply for instance that the worst case query satisfies the same asymptotic estimates as a typical query, and thereby resolve an old question of Chanzy, Devroye and Zamora-Cura [\emph{Acta Inf.}, 37:355--383, 2000]
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