R. Correa, A. Hantoute, M. A. López
Published 2017-07-12Version 1
We generalize and improve the original characterization given by Valadier [18, Theorem 1] of the subdifferential of the pointwise supremum of convex functions, involving the subdifferentials of the data functions at nearby points. We remove the continuity assumption made in that work and obtain a general formula for such a subdiferential. In particular, when the supremum is continuous at some point of its domain, but not necessarily at the reference point, we get a simpler version which gives rise to the Valadier formula. Our starting result is the characterization given in [11, Theorem 4], which uses the epsilon-subdifferential at the reference point.
Valadier-like formulas for the supremum function II: The compactly indexed case
Subdifferential of the supremum function: Moving back and forth between continuous and non-continuous settings
Formulae for the conjugate and the $\varepsilon$-subdifferential of the supremum function
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