Fixed point theorems for generalized weakly contractive mappings.
Fixed point theorems for multivalued mappings
Fixed point theorems for multivalued mappings
Fixed point theorems for non-compact approximative ANR's
Fixed point theorems for pseudo-monotone multifunctions
Fixed point theorems on spaces endowed with vector-valued metrics.
Fixed point theory for Mönch-type maps defined on closed subsets of Fréchet spaces: the projective limit approach.
Fixed points and coincidence points for multimaps with not necessarily bounded images.
Fixed points and continuity for multivalued mappings.
Fixed points for generalized multi-valued contractions
Fixed points for multivalued mappings in uniformly convex metric spaces.
Fixed points, index, and degree for some set valued functions
Fixed points of condensing multivalued maps in topological vector spaces.
Fixed points of discontinuous multivalued operators in ordered spaces with applications.
Fixed points of multivalued contractions with nonclosed, nonconvex values
For a class of multivalued contractions with nonclosed, nonconvex values, the set of all fixed points is proved to be nonempty and arcwise connected. Two applications are then developed. In particular, one of them is concerned with some properties of the set of all classical trajectories corresponding to continuous controls for a given nonlinear control system.
Fixed points of multivalued nonexpansive maps.
Fixed Points of n-Valued Multimaps of the Circle
A multifunction ϕ: X ⊸ Y is n-valued if ϕ(x) is an unordered subset of n points of Y for each x ∈ X. The (continuous) n-valued multimaps ϕ: S¹ ⊸ S¹ are classified up to homotopy by an integer-valued degree. In the Nielsen fixed point theory of such multimaps, due to Schirmer, the Nielsen number N(ϕ) of an n-valued ϕ: S¹ ⊸ S¹ of degree d equals |n - d| and ϕ is homotopic to an n-valued power map that has exactly |n - d| fixed points. Thus the Wecken property, that Schirmer established for manifolds...
Fixed points of set-valued maps with closed proximally ∞-connected values
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...
Fixed-point theorems for multi-valued functions and their applications to functional equations [Book]
Fix-finite approximation of n-valued multifunctions