Add to ORKGPick n points independently at random in R^2, according to a prescribed probability measure mu, and let D^n_1 <= D^n_2 <= ... be the areas of the binomial n choose 3 triangles thus formed, in non-decreasing order. If mu is absolutely continuous with respect to Lebesgue measure, then, under weak conditions, the set {n^3 D^n_i : i >= 1} converges as n --> infinity to a Poisson process with a constant intensity c(mu). This result, and related conclusions, are proved using standard arguments of Poisson approximation, and may be extended to functionals more general than the area of a triangle. It is proved in addition that, if mu is the uniform probability measure on the ...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
International audienceWe consider the convex hull of the perturbed point process comprised of $n$ i....
Pick n points independently at random in R^2, according to a prescribed probability measure...
Pick n points independently at random in R2, according to a prescribed probability measure µ, and le...
Pick n points independently at random in R , according to a prescribed probability measure , and l...
Consider a measure μλ = Σx ξx δx where the sum is over points x of a Poisson point process of intens...
If n points are independently and uniformly distributed in a large rectangular parallelepiped, A in ...
Let η t be a Poisson point process with intensity measure tμ , t>0 , over a Borel space X , where ...
AbstractLet ηt be a Poisson point process of intensity t≥1 on some state space Y and let f be a non-...
We defined the -dimensional Poisson() point process in an earlier essay [1] and exhibited moment for...
The d-dimensional Poisson process of intensity λ is a random scattering of points (called particles)...
AbstractWe give a new sufficient condition for convergence to a Poisson distribution of a sequence o...
We investigate the dense and sparse regions of a d-dimensional Poisson process and establish strong ...
Let ξ<SUB>1</SUB>, ξ<SUB>2</SUB>,… be a Poisson point process of density λ on (0,∞)<SUP>d</SUP>, d ≥...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
International audienceWe consider the convex hull of the perturbed point process comprised of $n$ i....
Pick n points independently at random in R^2, according to a prescribed probability measure...
Pick n points independently at random in R2, according to a prescribed probability measure µ, and le...
Pick n points independently at random in R , according to a prescribed probability measure , and l...
Consider a measure μλ = Σx ξx δx where the sum is over points x of a Poisson point process of intens...
If n points are independently and uniformly distributed in a large rectangular parallelepiped, A in ...
Let η t be a Poisson point process with intensity measure tμ , t>0 , over a Borel space X , where ...
AbstractLet ηt be a Poisson point process of intensity t≥1 on some state space Y and let f be a non-...
We defined the -dimensional Poisson() point process in an earlier essay [1] and exhibited moment for...
The d-dimensional Poisson process of intensity λ is a random scattering of points (called particles)...
AbstractWe give a new sufficient condition for convergence to a Poisson distribution of a sequence o...
We investigate the dense and sparse regions of a d-dimensional Poisson process and establish strong ...
Let ξ<SUB>1</SUB>, ξ<SUB>2</SUB>,… be a Poisson point process of density λ on (0,∞)<SUP>d</SUP>, d ≥...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
We consider the convex hull of the perturbed point process comprised of $n$ i.i.d. points, each dist...
International audienceWe consider the convex hull of the perturbed point process comprised of $n$ i....