On variational problems related to steepest descent curves and self dual convex sets on the sphere

Abstract

Let C be the family of compact convex subsets S of the hemisphere in with the property that S contains its dual S*; let u∈ S*, and let (S,u)=2ωn∫S\ < θ, u \ > \,\, dσ(θ). The problem to study ∈f \(S,u), S ∈ C, \, u∈ S* \ is considered. It is proved that the minima of are sets of constant width π/2 with u on their boundary. More can be said for n=3: the minimum set is a Reuleaux triangle on the sphere. The previous problem is related to the one to find the maximal length of steepest descent curves for quasi convex functions, satisfying suitable constraints. For n=2 let us refer to Manselli-Pucci. Here quite different results are obtained for n≥ 3.