Random dispersions of spheres are useful and appropriate models for a wide class of particulate random materials. They can be described in two equivalent and alternative ways—either by the multipoint moments of the characteristic function of the region, occupied by the spheres, or by the probability densities of the spheres ’ centers. On the “two-point ” level, a simple and convenient integral formula is derived which interconnects the radial distribution function of the spheres with the two-point correlation of the said characteristic function. As one of the possible applications of the formula, the behaviour of the correlation function near the origin is studied in more detail and related to the behaviour of the radial distribution functi...
We study the correlation between the total number of critical points of random spherical harmonics a...
<p>A) Simulated particle distributions are created by placing particles with radii of two arbitrary ...
In this paper we consider a tessellation V generated by a homogeneous Poisson process Φ in Rd and, f...
For a random arrays of identical spheres the “particle-center ” correlation Fpc(r) is considered. A ...
We consider a random two-phase medium which represents a matrix containing an array of allowed to ov...
In this thesis, we discuss some results on the distribution of points on the sphere, asymp-totically...
At the heart of physics of fluids are particle distribution functions. If all of these functions of ...
Simple parameter-free analytic bias functions for the two-point correlation of densities in spheres ...
Simple parameter-free analytic bias functions for the two-point correlation of densities in spheres ...
We analyze correlation functions in a toy model of a random geometry interacting with matter. We sho...
Context. Two-point correlation functions are used throughout cosmology as a measure for the statisti...
We study how the two-point density correlation properties of a point particle distribution are modif...
We consider the correlation functions of areas between coalescing random walkers as a candidate for ...
Previously, we have proposed an approximation for the contact values of the radial distribution func...
Many of the most fundamental forces in nature are dependent of the relative distance between points....
We study the correlation between the total number of critical points of random spherical harmonics a...
<p>A) Simulated particle distributions are created by placing particles with radii of two arbitrary ...
In this paper we consider a tessellation V generated by a homogeneous Poisson process Φ in Rd and, f...
For a random arrays of identical spheres the “particle-center ” correlation Fpc(r) is considered. A ...
We consider a random two-phase medium which represents a matrix containing an array of allowed to ov...
In this thesis, we discuss some results on the distribution of points on the sphere, asymp-totically...
At the heart of physics of fluids are particle distribution functions. If all of these functions of ...
Simple parameter-free analytic bias functions for the two-point correlation of densities in spheres ...
Simple parameter-free analytic bias functions for the two-point correlation of densities in spheres ...
We analyze correlation functions in a toy model of a random geometry interacting with matter. We sho...
Context. Two-point correlation functions are used throughout cosmology as a measure for the statisti...
We study how the two-point density correlation properties of a point particle distribution are modif...
We consider the correlation functions of areas between coalescing random walkers as a candidate for ...
Previously, we have proposed an approximation for the contact values of the radial distribution func...
Many of the most fundamental forces in nature are dependent of the relative distance between points....
We study the correlation between the total number of critical points of random spherical harmonics a...
<p>A) Simulated particle distributions are created by placing particles with radii of two arbitrary ...
In this paper we consider a tessellation V generated by a homogeneous Poisson process Φ in Rd and, f...