The purpose of this research is to establish the existence of coincidence and common fixed
points for Reich type co-cyclic contraction in dislocated quasi-metric space and to show the
uniqueness of the common fixed point. ...
In this thesis, we introduced generalized weakly contractive mappings, established
a common fixed point result and proved the existence and uniqueness of a common
fixed point for a pair of self-mappings in setting of ...
In this research work we establish a common fixed point result in cone b-heptagonal metric spaces and proved the existence and uniqueness of a common fixed point for a pair of self-mappings involving certain contractive ...
The aim of this research project was to extend the result of Yongfu Su [26] and to obtain some new fixed point theorems for f-contraction mapping in a complete metric space endowed with a partial order by using generalized ...
This research dealt with common fixed points for generalized contraction and Zamfirescu pair of maps in cone b-metric spaces. In 2010, Babu et al. [1] established the existence of unique common fixed points for generalized ...
This research dealt with common fixed point results of ( )-contractions involving rational expressions in partial order metric spaces by extending the works of Chandok et al.,. Our results extend the results of Chandok et ...
In this study, we established some common fixed point results in b-rectangular partially ordered metric space in the framework of metric spaces endowed with a partial order by extending the works of Roshan et al,. Our ...
Vasile Berinde [9] obtained the existence and uniqueness of coincidence and common fixed points of non-commuting almost contractions in cone metric spaces. Inspired and motivated by the main result of Berinde [9], in this ...
In this thesis, Chebyschev iteration technique has been presented to solve second order
singularly perturbed 1D reaction – diffusion equation for a very small perturbation
parameter, with both variable and constant ...
In this study, discrete sixth order implicit linear multistep methods (LMM) in block form of uniform step size for the solution of initial value problems (IVPs) for ordinary differential equations (ODEs) was presented using ...
In this study, discrete fourth order implicit linear multistep methods (LMMs) in block form for the solution of stiff first order initial value problems (IVPs) was presented using power series as a basis and the Chebyshev ...
The main purpose of this study was to develop a scheme to find analytic solutions of multidimensional homogeneous time fractional heat like equations under initial conditions by using reduced differential transform method. ...
In this study Fractional Reduced Differential Transform Method (FRDTM) is presented for solving one dimensional parabolic beam equation. FRDTM is an effective tool to solve partial differential equations analytically. This ...
In this thesis, the analysis of the MagnetoHydroDynamics(MHD) flow of nanofluid
over a porous medium of an exponentially stretching sheet with convective boundary condition in presence of suction/injection is studied. ...
The aim of this thesis is to analyze the the solution of analytical solution of a Poiseulle flow of
incompressible fluid between two fixed concentric circular cylinders with radius subjact to
slip boundary ...
Queues with Markovian service process (MSP) are mainly useful in modeling and performance analysis of telecommunication networks based on asynchronous transfer mode (ATM) environment. This paper analyzes a finite buffer ...
This study aims to analyze analytical solutions of the Couette flow of incompressible fluid between two coaxial cylinders, generated due to constant density and viscosity using no -slip boundary conditions. Two distinct ...