On Buffon's problem for a lattice and its deformations

Giuseppe Caristi and Massimiliano Ferrara

Abstract: We consider the Buffon's problem for the lattice $R_{\alpha,a}$ which has the fundamental cell composed by the union of octagon, with all sides of lengths $a$ and the angles $(\pi-\alpha)$ and $(\frac{\pi}{2}+\alpha)$ with $\alpha\in\left.\right]0,\frac{\pi}{2}\left[\right.$, and of the square with side of length $a$ (see Fig. 1). We determine the probability of intersection of a body test needle of length $l,\ l<a$. For $\alpha=\frac{\pi}{4}$ we also give the estimate of this probability for the cases, when the segment is non-small with respect to $R_{\frac{\pi}{4},a}$ (see [D1], [D2]).

[D1] Duma, A.: Problems of Buffon type for ``non-small'' needles. Rend. Circ. Mat. Palermo, Serie II, Tomo XLVIII (1999), 23--40.

[D2] Duma, A.: Problems of Buffon type for ``non-small'' needles (II). Rev. Roum. Math. Pures Appl., Tome XLIII, 1--2 (1998), 121--135.

Keywords: geometric probability, stochastic geometry, random sets, random convex sets and integral geometry

Classification (MSC2000): 60D05, 52A22

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