Coincidence fixed point theorem in a Menger probabilistic metric spaces

Print   Print  

Authors :

Razieh Farokhzad Rostami1*

Author Address :

1Department of Mathematics, Faculty of Sciences and Engineering, Gonbad Kavous University, P. O. Box 163, Golestan, Iran.

*Corresponding author.

Abstract :

In this paper, we discuss the existence and uniqueness of solutions for a class of multi-term time-fractional impulsive integro-differential equations with state dependent delay subject to some fractional order integral boundary conditions. In our consideration, we apply the Banach, and Sadovskii fixed point theorems to obtain our main results under some appropriate assumptions. An example is given at the end to illustrate the applications of the established results.Fixed point theory of nonexpansive type single valued mappings provides techniques for solving a variety of applied problems in mathematical sciences and engineering. The aim of this paper is to prove the existence of coincidence points, coupled points and common coupled fixed points of nonexpansive type conditions satisfied by single valued maps which include both continuous and discontinuous mappings on Menger probabilistic metric spaces.

Keywords :

Menger PM space, nonexpansive mappings, compatible mappings, common fixed point, common coupled fixed point, coincidence point, coupled point, weak reciprocal continuity, reciprocal continuity.

DOI :

10.26637/MJM0603/0007

Article Info :

Received : August 06, 2017; Accepted : February 12, 2018.

 

 

Search Information Pages

Go to Top

©2018 MJM - Malaya Journal of Matematik. All rights reserved.
web counter