Some fixed point theorems for Hardy-Rogers type mappings.
Some Fixed Point Theorems for Kannan Mappings
2000 Mathematics Subject Classification: Primary: 47H10; Secondary: 54H25.Some results on the existence and uniqueness of fixed points for Kannan mappings on admissible subsets of bounded metric spaces and on bounded closed convex subsets of complete convex metric spaces having uniform normal structure are proved in this paper. These results extend and generalize some results of Ismat Beg and Akbar Azam [Ind. J. Pure Appl. Math. 18 (1987), 594-596], A. A. Gillespie and B. B. Williams [J. Math. Anal....
Some fixed point theorems for multivalued mappings
Some fixed point theorems for set valued directional contraction mappings.
Some fixed point theorems for weak contraction conditions of integral type.
Some fixed point theorems in generating spaces of quasi-metric family
The aim of this paper is to introduce the concepts of compatible mappings and compatible mappings of type in non-Archimedean Menger probabilistic normed spaces and to study the existence problems of common fixed points for compatible mappings of type , also, we give an applications by using the main theorems.
Some fixed point theorems in logarithmic convex structures
Some fixed point theorems in metric and 2-metric spaces.
Some fixed point theorems in metric and Banach spaces
Some fixed point theorems in metric spaces
Some fixed point theorems in metric spaces by altering distances
A generalization is obtained for some of the fixed point theorems of Khan, Swaleh and Sessa, Pathak and Rekha Sharma, and Sastry and Babu for a self-map on a metric space, which involve the idea of alteration of distances between points.
Some fixed point theorems of integral type contraction in cone metric spaces.
Some fixed point theorems of the mappings of partially ordered sets
Some fixed point theorems on ordered metric spaces and application.
Some fixed point theorems with applications to best simultaneous approximations.
Some fixed points of expansion mappings.
Some fixed points theorems in generalized -metric spaces.
Some fixed-point theorems for multivalued monotone mappings in ordered uniform space.
Some generalizations of fixed point theorems in cone metric spaces.
Some homotopy theoretical questions arising in Nielsen coincidence theory
Basic examples show that coincidence theory is intimately related to central subjects of differential topology and homotopy theory such as Kervaire invariants and divisibility properties of Whitehead products and of Hopf invariants. We recall some recent results and ask a few questions which seem to be important for a more comprehensive understanding.