Singularities of Fitzpatrick and convex functions

Abstract

In a pseudo-Euclidean space with scalar product S(·, ·), we show that the singularities of projections on S-monotone sets and of the associated Fitzpatrick functions are covered by countable c-c surfaces having positive normal vectors with respect to the S-product. By Zaj\'cek [24], the singularities of a convex function f can be covered by a countable collection of c-c surfaces. We show that the normal vectors to these surfaces are restricted to the cone generated by F-F, where F:=cl range ∇ f, the closure of the range of the gradient of f.

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