Set-Valued α-Almost Convex Mappings

By means of the Minkowski function we define a new concept of local Holder Ž . equicontinuity respectively local Holder continuity for families consisting of Ž . set-valued mappings respectively for set-valued mappings between topological linear spaces. The connection between this new concept and t

We consider the following quasi-mildly nonlinear complementarity problems for set-valued mappings: to find \(\bar{x} \in k(\bar{x}), \bar{y} \in V(\bar{x})\), such that \[ \begin{gathered} M \bar{x}+q+A \bar{y} \in k^{*}(\bar{x}) \\ \langle\bar{x}-m(\bar{x}), M \bar{x}+q+A \bar{y}\rangle=0 \end{gat

We define a notion of Nash equilibrium for an arbitrary family of set-valued maps with values in pre-ordered sets. An existence theorem of such a Nash equilibrium is obtained from an intersection theorem for an arbitrary family of setvalued maps, generalizing results of Ky Fan, for example 1994 Acad