Method of nose stretching in Newton's problem of minimal resistance

Abstract

We consider the problem ∈f\ ∫\!\!∫ (1 + |∇ u(x,y)|2)-1 dx dy : the function u : R is concave and 0 u(x,y) M for all (x,y) ∈ =\ (x,y): x2 + y2 1 \ \, \ (Newton's problem) and its generalizations. In the paper BrFK it is proved that if a solution u is C2 in an open set U ⊂ then D2u = 0 in U. It follows that graph(u)U does not contain extreme points of the subgraph of u. In this paper we prove a somewhat stronger result. Namely, there exists a solution u possessing the following property. If u is C1 in an open set U ⊂ then graph(uU) does not contain extreme points of the convex body Cu = \ (x,y,z) :\, (x,y) ∈ ,\ 0 z u(x,y) \. As a consequence, we have Cu = Conv ( SingCu), where SingCu denotes the set of singular points of ∂ Cu. We prove a similar result for a generalized Newton's problem.