Sylvester's question and the Random Acceleration Process

Abstract

Let n points be chosen randomly and independently in the unit disk. "Sylvester's question" concerns the probability pn that they are the vertices of a convex n-sided polygon. Here we establish the link with another problem. We show that for large n this polygon, when suitably parametrized by a function r(phi) of the polar angle phi, satisfies the equation of the random acceleration process (RAP), d2 r/d phi2 = f(phi), where f is Gaussian noise. On the basis of this relation we derive the asymptotic expansion log pn = -2n log n + n log(2 pi2 e2) - c0 n1/5 + ..., of which the first two terms agree with a rigorous result due to Barany. The nonanalyticity in n of the third term is a new result. The value 1/5 of the exponent follows from recent work on the RAP due to Gyorgyi et al. [Phys. Rev. E 75, 021123 (2007)]. We show that the n-sided polygon is effectively contained in an annulus of width n-4/5 along the edge of the disk. The distance deltan of closest approach to the edge is exponentially distributed with average 1/(2n).