Random equilibrium problems on networks

The purpose of this paper is to construct solutions of self-adjoint boundary value problems on finite networks. To this end, we obtain explicit expressions of the Green functions for all different boundary value problems. The method consists of reducing each boundary value problem either to a Dirich

In this paper, some generalized concepts about semicontinuity and convexity for vector-valued bifunctions are introduced. A new existence theorem for vector equilibrium problems is proved. Further, a random version of this result is considered. Applications to cone saddle points, random vector optim

A fully interconnected network consisting of n elements with outputs x = {xi; xi = +1; -1; 16i6n}; connection weights wij = w s ij + cw a ij composed of symmetric and antisymmetric parts, and dynamics described by x → {sign( wijxj)} is considered. Here the {w s ij ; w a ij ; w kk ; i ¡ j} are i.i.d.