Jasper Ischebeck
Published 2023-05-24Version 1
We give theorems about asymptotic normality of general additive functionals on patricia tries in an i.i.d. setting, derived from results on tries by Janson (2022). These theorems are applied to show asymptotic normality of the distribution of random fringe trees in patricia tries. Formulas for asymptotic mean and variance are given. The proportion of fringe trees with $k$ keys is asymptotically, ignoring oscillations, given by $(1-\rho(k))/(H+J)k(k-1)$ with the source entropy $H$, an entropy-like constant $J$, that is $H$ in the binary case, and an exponentially decreasing function $\rho(k)$. Another application gives asymptotic normality of the independence number.
Central limit theorems for additive functionals and fringe trees in tries
Central Limit Theorems for Radial Random Walks on $p\times q$ Matrices for $p\to\infty$
Central limit theorems for hyperbolic spaces and Jacobi processes on $[0,\infty[$
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