| Let (E, ‖·‖) be a uniformly convex Banach space, X a nonempty compact and convex subset of E. Let F be a closed mapping of X×X into 2X, G a mapping of X×X into C(X). It is shown that if for any f∈C(X), x∈X, F(x,f(x)) is a closed and convex subset of X, and G(x,f(x)) is a continuous function and for any x,y1,y2∈X,H(x,G(x,y1),G(x,y2))≤‖y1-y2‖ then there exist X0,y0∈X such that X0∈F(x0,y0) and y0∈G(x0, y0). |
