Phase transition in a stochastic geometry model with applications to statistical mechanics

Abstract: We study the connected components of the stochastic geometry model on Poisson points which is obtained by connecting points with a probability that depends on their relative position. Equivalently, we investigate the random clusters of the random connection model defined on the points of a Poisson process in d-dimensional space where the links are added with a particular probability function. We use the thermodynamic relations between free energy, entropy, and internal energy to find the functions of the clust… Show more