Guillaume Grelier, Matías Raja
Published 2021-02-05Version 1
Non-convex functions that yet satisfy a condition of uniform convexity for non-close points can arise in discrete constructions. We prove that this sort of discrete uniform convexity is inherited by the convex envelope, which is the key to obtain other remarkable properties such as the coercivity. Our techniques allow to retrieve Enflo's uniformly convex renorming of super-reflexive Banach spaces as the regularization of a raw function built from trees. Among other applications, we provide a sharp estimation of the distance of a given function to the set of differences of Lipschitz convex functions. Finally, we prove the equivalence of several natural fashions to quantify the non-super weakly compactness of a subset of a Banach space.
Smooth norms and approximation in Banach spaces of the type C(K)
Vector-valued Walsh-Paley martingales and geometry of Banach spaces
Embedding $\ell_{\infty}$ into the space of all Operators on Certain Banach Spaces
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