4 research outputs found
Some Fixed-Point Theorems for Multivalued Monotone Mappings in Ordered Uniform Space
We use the order relation on uniform spaces defined by Altun and Imdad (2009) to prove some new fixed-point and coupled fixed-point theorems for multivalued monotone mappings in ordered uniform spaces.</p
Coupled coincidence point theorems for compatible mappings in ordered uniform space
In this paper, we use the order relation on uniform spaces defined by [5] to introduce the notion of compatibility of mappings in an ordered uniform space and use this notion to establish coupled coincidence point theorems to ordered uniform space. An example is also given
COUPLED COINCIDENCE POINT THEOREMS FOR COMPATIBLE MAPPINGS IN ORDERED UNIFORM SPACE
In this paper, we use the order relation on uniform spaces defined by
{[}5] to introduce the notion of compatibility of mappings in an ordered
uniform space and use this notion to establish coupled coincidence point
theorems to ordered uniform space. An example is also given
Fixed points of non-Newtonian contraction mappings on non-Newtonian metric spaces
The study of non-Newtonian calculi was started in 1972 by Grossman and Katz. These calculi provide an alternative to the classical calculus and they include the geometric, anageometric and bigeometric calculi, etc. Recently, C, akmak and Ba, sar ( 2002) have studied the concept of non-Newtonian metric. Also they have given the triangle and Minkowski's inequalities in the sense of non-Newtonian calculus. In this paper, we introduce a fixed point theory by defining some topological structures of the relevant non-Newtonian metric space
