The probabilities for the number of intersections in the Buffon-Laplace needle problem in Rd

Abstract

In 1974, Stoka solved Buffon's needle problem in Rd, d 2, i.e. he found a closed form solution for the probability that a line segment ("needle") with length intersects a grid of parallel hyperplanes with mutual distance a. For the Laplace needle problem in Rd, where there are d families of parallel hyperplanes with distances a1,…,ad fulfilling (a1,…,ad), and normal vectors in the direction of the coordinate axes x1,…,xd, he was only able to give a closed solution for the case that the needle intersects hyperplanes of all families simultaneously. In the present paper, we calculate the probabilities pd(i) of exactly i, 0 i d, intersection points between the needle and the hyperrectangular grid formed by the d families, and conclude the expected value and the variance for the number of intersection points. Furthermore, we present a simulation program and some numerical results.