Quantifying minimal non-collinearity among random points

Abstract

Let n,K denote the largest angle in all the triangles with vertices among the n points selected at random in a compact convex subset K of Rd with nonempty interior, where d2. It is shown that the distribution of the random variable λd(K)\,n33!\,(π-n,K)d-1, where λd(K) is a certain positive real number which depends only on the dimension d and the shape of K, converges to the standard exponential distribution as n∞. By using the Steiner symmetrization, it is also shown that λd(K) -- which is referred to in the paper as the elongation of K -- attains its minimum if and only if K is a ball B(d) in Rd. Finally, the asymptotics of λd(B(d)) for large d is determined.