Applied Mathematics

Lasalle Invariance Principle For Ordinary Differential Equations And Applications

The most popular method for studying stability of nonlinear systems is introduced

A Hybrid Algorithm For Approximating A Common Element Of Solutions Of A Variational Inequality Problem And A Convex Feasibility Problem

ABSTRACT In this thesis, a hybrid extragradient-like iteration algorithm for appr

Approximation Of Solution Of Generalized Equilibrium Problems And Common Fixed Point Of Finite Family Of Strict Pseudocontractions With Application

ABSTRACT In this thesis, we consider the problem of approximating solution of gen

Maximal Monotone Operators On Hilbert Spaces And Applications

ABSTRACT Let H be a real Hilbert space and A : D(A) ⊂ H → H be an unbounded, line

Sobolev Spaces And Variational Method Applied To Elliptic Partial Differential Equations

INTRODUCTION Variational methods have proved to be very important in the study of

Floquet Theory and Applications

Introduction In physical sciences (e.g, elasticity, astronomy) and natural scienc

Minimum Principle of Pontryagin

Preface This Project is at the interface between Optimization, Functional analysi

Deterministic And Stochastic Model Of Dynamics Of Ebola Virus

ABSTRACT        In this work a deterministic and stochastic model is developed to

Spectral Theory Of Compact Linear Operators And Applications

This Project primarily falls into the field of Linear Functional Analysis and its

Why Classical Finite Difference Approximations Fail For A Singularly Perturbed System Of Convection-Diffusion Equations

ABSTRACT We consider classical Finite Difference Scheme for a system of singularl

A Naive Finite Difference Approximations For Singularly Perturbed Parabolic Reaction-Diffusion Problems

ABSTRACT In this thesis, we treated a Standard Finite Difference Scheme for a sin

Evolution Equations and Applications

This project concerns Evolution Equations in Banach spaces and lies at the interf

Contributions To The Control Theory Of Some Partial Functional Integrodifferential Equations In Banach Spaces

ABSTRACT This thesis is a contribution to Control Theory of some Partial Function

A Strong Convergence Theorem For Zeros Of Bounded Maximal Monotone Mappings In Banach Spaces With Applications

ABSTRACT Let E be a uniformly convex and uniformly smooth real Banach space and E

Controllability And Stabilizability Of Linear Systems In Hilbert Spaces

INTRODUCTION Questions about controllability and stability arise in almost every

Sobolev Spaces and Linear Elliptic Partial Differential Equations

The cardinal goal to the study of theory of Partial Differential Equations (PDEs)

On J-Fixed Points Of J-Pseudocontractions With Applications

ABSTRACT Let E be a real normed space with dual space E ∗ and let A : E → 2 E∗ be

Isoperimetric Variational Techniques and Applications.

The exploitation of nature's propensity offers us ample opportunities to achieve

Integration In Lattice Spaces

Abstract The goal of this thesis is to extend the notion of integration with resp

About Crawling Scheduling Problems

Abstract This paper investigates the task of scheduling jobs across several serve

Weak And Strong Convergence Theorems For Nonspreading Type Mapping In A Hilbert Spaces

ABSTRACT The work of Osilike and Isiogugu, Nonlinear Analysis, 74 (2011), 1814-18

Stochastic Models for Asset Pricing

Abstract Stochastic calculus has been applied to the problems of pricing financia

Multi-Fractal Spectrum Model For The Measurement of Random Behavior of Equity Returns

ABSTRACT The asset price returns are multi-period (that is multi-fractal dimensio

Numerical Solution Of Special Second Order Initial Value Problems By Hybrid Type Method

INTRODUCTION The foreign policy of a nation is a reflection of its national deman

A Modified Subgradient Extragradient Method For Solving Monotone Variational Inequalities In Banach Spaces

ABSTRACT The subgradient extragradient method is considered an improvement of the

A Two-Small-Parameter Dynamic Buckling Analysis Of A Damped Quadratic-Cubic Nonlinear Structure

ABSTRACT The major goal of this research work is to determine the dynamic bucklin

A Comparative Study Of Interior Point, Simplex And Active Set Methods For The Solution Of Linear Programming Problems.

CHAPTER ONE INTRODUCTION 1.1 BACKGROUND OF THE STUDY Linear Programming is a subs

FINITE DEFORMATION OF ROTATING SPHERE OF BLATZ - KO MATERIAL

ABSTRACT Finite deformation of Elastic rotating solid spheres of blatz-ko materia