Random configurations are considered that are generated by a Poisson process of figures in the plane, and a recent result is used to derive formulae for the estimation of the number of figures, and their mean area and perimeter. The formulae require merely the determination of the area, the perimeter, and the Euler-Poincaré characteristic of the random configurations in a fixed field of view. There are no similar formulae for the standard deviations of the estimates; their magnitudes in typical cases are therefore assessed by Monte Carlo simulations
We are interested in creating statistical methods to provide informative summaries of random fields ...
The aim of this thesis is to improve our understanding of random planar maps decorated by statistica...
If n points are independently and uniformly distributed in a large rectangular parallelepiped, A in ...
Random configurations are considered that are generated by a Poisson process of figures in the plane...
Random configurations are considered that are generated by a Poisson process of figures in the plane...
When two-dimensional figures, called laminae, are randomly placed on a plane domains result that can...
The challenges of examining random partitions of space are a significant class of problems in the th...
AbstractThe probability distributions (defined in an ergodic sense) of various aggregates of random ...
When two-dimensional figures, called laminae, are randomly placed on a plane domains result that can...
We are interested in creating statistical methods to provide informative summaries of random fields ...
We defined the -dimensional Poisson() point process in an earlier essay [1] and exhibited moment for...
International audiencewhere the sum is across the individual areas Ai of the region of interest as o...
We investigate the problem of automatically creating 3D models of man-made environments that we repr...
This paper considers random balls in a D-dimensional Euclidean space whose centers are prescribed by...
In this paper, we study the approximation of π through the semiperimeter or area of a random n-sided...
We are interested in creating statistical methods to provide informative summaries of random fields ...
The aim of this thesis is to improve our understanding of random planar maps decorated by statistica...
If n points are independently and uniformly distributed in a large rectangular parallelepiped, A in ...
Random configurations are considered that are generated by a Poisson process of figures in the plane...
Random configurations are considered that are generated by a Poisson process of figures in the plane...
When two-dimensional figures, called laminae, are randomly placed on a plane domains result that can...
The challenges of examining random partitions of space are a significant class of problems in the th...
AbstractThe probability distributions (defined in an ergodic sense) of various aggregates of random ...
When two-dimensional figures, called laminae, are randomly placed on a plane domains result that can...
We are interested in creating statistical methods to provide informative summaries of random fields ...
We defined the -dimensional Poisson() point process in an earlier essay [1] and exhibited moment for...
International audiencewhere the sum is across the individual areas Ai of the region of interest as o...
We investigate the problem of automatically creating 3D models of man-made environments that we repr...
This paper considers random balls in a D-dimensional Euclidean space whose centers are prescribed by...
In this paper, we study the approximation of π through the semiperimeter or area of a random n-sided...
We are interested in creating statistical methods to provide informative summaries of random fields ...
The aim of this thesis is to improve our understanding of random planar maps decorated by statistica...
If n points are independently and uniformly distributed in a large rectangular parallelepiped, A in ...