Fixed Point Theorems for Weakly Inward Multivalued Mappings and Their Randomizations

Let D be a closed nonempty subset of a Banach space X and T : D ª X Ä 4 2 \_ a multivalued contraction with closed values, i.e., each Tx is a nonempty closed subset of X and there exists 0 F k -1 such that 5 5 H Tx, Ty F k x y y , x, y g D, ## Ž . where H denotes the Hausdorff metric H A, B s ma

The following theorem generalizes results given by FISHER [l] and Jungck [3].

Using certain weak conditions of commutativity we prove some common fixed point theorems in complete metrically convex spaces which, in turn, generalize results due to Assad and Kirk, Itoh, Khan, and several others.

We study maps T for which J y T is pseudo-monotone; we call such T a PM-map. This includes compact maps in suitable spaces and pseudo-contractive maps in Hilbert spaces. We study variational inequalities in a situation which was previously done only when T is compact. We show that our variational in