Convex KKM maps, monotone operators and Minty variational inequalities
classification
🧮 math.OC
keywords
convexmintyinequalitiesmapsmonotoneoperatorstermsvariational
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It is known that for convex sets, the KKM condition is equivalent to the finite intersection property. We use this equivalence to obtain a characterisation of monotone operators in terms of convex KKM maps and in terms of the existence of solutions to Minty variational inequalities. The latter result provides a converse to the seminal theorem of Minty.
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