Martin Raič scite author profile

The purpose of the present paper is to establish explicit bounds on moderate deviation probabilities for a rather general class of geometric functionals enjoying the stabilization property, under Poisson input and the assumption of a certain control over the growth of the moments of the functional and its radius of stabilization. Our proof techniques rely on cumulant expansions and cluster measures and yield completely explicit bounds on deviation probabilities. In addition, we establish a new criterion for the limiting variance to be non-degenerate. Moreover, our main result provides a new central limit theorem, which, though stated under strong moment assumptions, does not require bounded support of the intensity of the Poisson input. We apply our results to three groups of examples: random packing models, geometric functionals based on Euclidean nearest neighbors and the sphere of influence graphs.Comment: 52 page

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A multivariate Berry–Esseen theorem with explicit constants

Raič¹

2019

Bernoulli

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~raicm/We provide a Lyapunov type bound in the multivariate central limit theorem for sums of independent, but not necessarily identically distributed random vectors. The error in the normal approximation is estimated for certain classes of sets, which include the class of measurable convex sets. The error bound is stated with explicit constants. The result is proved by means of Stein's method. In addition, we improve the constant in the bound of the Gaussian perimeter of convex sets.

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A Multivariate CLT for Decomposable Random Vectors with Finite Second Moments

Raič

2004

Journal of Theoretical Probability

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Concentration of measure for the number of isolated vertices in the Erdős–Rényi random graph by size bias couplings

Ghosh¹,

Goldstein²,

Raič³

2011

Statistics & Probability Letters

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Martin Raič

Moderate deviations for stabilizing functionals in geometric probability

A multivariate Berry–Esseen theorem with explicit constants

A Multivariate CLT for Decomposable Random Vectors with Finite Second Moments

Concentration of measure for the number of isolated vertices in the Erdős–Rényi random graph by size bias couplings

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