Moments in Pearson's Four-Step Uniform Random Walk Problem and Other Applications of Very Well-Poised Generalized Hypergeometric Series

Abstract: This paper considers the representation of odd moments of the distribution of a four-step uniform random walk in even dimensions, which are based on both linear combinations of two constants representable as contiguous very well-poised generalized hypergeometric series and as even moments of the square of the complete elliptic integral of the first kind. Neither constants are currently available in closed form. New symmetries are found in the critical values of the L-series of two underlying cusp forms, provid… Show more

“…In paper, 23 uncorrelated and unbiased variants of the Pearson random walk in Euclidean spaces $$$ {\mathbb{R}}^d $$$ without simulation were considered. Paper 24 deals with the representation of odd moments of the distribution of a four‐step uniform Pearson random walk in even dimensions. Pearson random walks have also been applied to the modeling of transport and reaction of gasses in Vignoles 25 …”

Comparison of simulation and analytical models for the distribution of a group of agents moving in random directions

“…In paper, 23 uncorrelated and unbiased variants of the Pearson random walk in Euclidean spaces $$$ {\mathbb{R}}^d $$$ without simulation were considered. Paper 24 deals with the representation of odd moments of the distribution of a four‐step uniform Pearson random walk in even dimensions. Pearson random walks have also been applied to the modeling of transport and reaction of gasses in Vignoles 25 …”

Comparison of simulation and analytical models for the distribution of a group of agents moving in random directions