Explicit formulas for C1, 1 and C1, ωconv extensions of 1-jets in Hilbert and superreflexive spaces

Abstract

Given X a Hilbert space, ω a modulus of continuity, E an arbitrary subset of X, and functions f:E, G:E X, we provide necessary and sufficient conditions for the jet (f,G) to admit an extension (F, ∇ F) with F:X R convex and of class C1, ω(X), by means of a simple explicit formula. As a consequence of this result, if ω is linear, we show that a variant of this formula provides explicit C1,1 extensions of general (not necessarily convex) 1-jets satisfying the usual Whitney extension condition, with best possible Lipschitz constants of the gradients of the extensions. Finally, if X is a superreflexive Banach space, we establish similar results for the classes C1, αconv(X).