FG-coupled Fixed Point Theorems for Contractive Type Mappings in Partially Ordered Metric Spaces
Journal Title: Journal of Mathematics and Applications - Year 2018, Vol 41, Issue
Abstract
In this paper we prove FG-coupled fixed point theorems for Kannan, Reich and Chatterjea type mappings in partially ordered complete metric spaces using mixed monotone property.
Authors and Affiliations
Deepa Karichery, Shaini Pulickakunnel
Keywords
Related Articles
- EP ID EP426996
- DOI 10.7862/rf.2018.11
- Views 86
- Downloads 0
The random of lacunary statistical on χ2 over p-metric spaces defined by Musielak
Mursaleen introduced the concepts of statistical convergence in random 2-normed spaces. Recently Mohiuddine and Aiyup defined the notion of lacunary statistical convergence and lacunary statistical Cauchy in random 2-nor...
Properties of higher order differential polynomials generated by solutions of complex differential equations in the unit disc
The main purpose of this paper is to study the controllability of solutions of the differential equation [formula]. In fact, we study the growth and oscillation of higher order differential polynomial with meromorphic co...
On the zeros of an analytic function
Kuniyeda, Montel and Toya had shown that the polynomial p(z) = [formula]; a_0 ≠ 0, of degree n, does not vanish in [formula], where p > 1, q > 1, (1/p) + (1/q) = 1 and we had proved that p(z) does not vanish in [formula]...
Problem with integral condition for evolution equation
We propose a method of solving the problem with nonhomogeneous integral condition for homogeneous evolution equation with abstract operator in a linear space H. For right-hand side of the integral condition which belongs...
Existence and Controllability Results for Sobolev-type Fractional Impulsive Stochastic Differential Equations with Infinite Delay
In this paper, we prove the existence of mild solutions for Sobolev-type fractional impulsive stochastic differential equations with infi nite delay in Hilbert spaces. In addition, the controllability of the system with...