Fixed points of condensing multivalued maps in topological vector spaces.
We introduce the classes of nearly contraction mappings and nearly asymptotically nonexpansive mappings. The class of nearly contraction mappings includes the class of contraction mappings, but the class of nearly asymptotically nonexpansive mappings contains the class of asymptotically nonexpansive mappings and is contained in the class of mappings of asymptotically nonexpansive type. We study the existence of fixed points and the structure of fixed point sets of mappings of these classes in Banach...
We prove the following theorem: Let p > 1 and let E be a real p-uniformly convex Banach space, and C a nonempty bounded closed convex subset of E. If is a Lipschitzian semigroup such that , where c > 0 is some constant, then there exists x ∈ C such that for all s ∈ G.
W.A. Kirk in 1971 showed that if , where is a closed and convex subset of a Banach space, is -periodic and uniformly -lipschitzian mapping with , then has a fixed point. This result implies estimates of for natural for the general class of -lipschitzian mappings. In these cases, are less than or equal to 2. Using very simple method we extend this and later results for a certain subclass of the family of -lipschitzian mappings. In the paper we show that in any Banach space. We also...
In this paper we give new estimates for the Lipschitz constants of n-periodic mappings in Hilbert spaces, in order to assure the existence of fixed points and retractions on the fixed point set.
Introduction Many authors have developed the topological degree theory and the fixed point theory for set-valued maps using homological techniques (see for example [19, 28, 27, 16]). Lately, an elementary technique of single-valued approximation (on the graph) (see [11, 1, 13, 5, 9, 2, 6, 7]) has been used in constructing the fixed point index for set-valued maps with compact values (see [21, 20, 4]). In [20, 4] authors consider set-valued upper semicontinuous...