Simultaneous smoothness and simultaneous stability of a C∞ strictly convex integrand and its dual

Abstract

In this paper, we investigate simultaneous properties of a convex integrand γ and its dual δ. The main results are the following three. (1) For a C∞ convex integrand γ: Sn R+, its dual convex integrand δ: Sn R+ is of class C∞ if and only if γ is a strictly convex integrand. (2) Let γ: Sn R+ be a C∞ strictly convex integrand. Then, γ is stable if and only if its dual convex integrand δ: Sn R+ is stable. (3) Let γ: Sn R+ be a C∞ strictly convex integrand. Suppose that γ is stable. Then, for any i (0 i n), a point θ0∈ Sn is a non-degenerate critical point of γ with Morse index i if and only if its antipodal point -θ0∈ Sn is a non-degenerate critical point of the dual convex integrand δ with Morse index (n-i).