Coverage processes on spheres and condition numbers for linear programming

Abstract

This paper has two agendas. Firstly, we exhibit new results for coverage processes. Let p(n,m,α) be the probability that n spherical caps of angular radius α in Sm do not cover the whole sphere Sm. We give an exact formula for p(n,m,α) in the case α∈[π/2,π] and an upper bound for p(n,m,α) in the case α∈ [0,π/2] which tends to p(n,m,π/2) when απ/2. In the case α∈[0,π/2] this yields upper bounds for the expected number of spherical caps of radius α that are needed to cover Sm. Secondly, we study the condition number C(A) of the linear programming feasibility problem ∃ x∈Rm+1Ax0,x0 where A∈Rn×(m+1) is randomly chosen according to the standard normal distribution. We exactly determine the distribution of C(A) conditioned to A being feasible and provide an upper bound on the distribution function in the infeasible case. Using these results, we show that E(C(A))2(m+1)+3.31 for all n>m, the sharpest bound for this expectancy as of today. Both agendas are related through a result which translates between coverage and condition.