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Asymptotic Integration Of Dynamical Systems

In almost all works in the literature there are several results showing asymptotic relationships between the solutions of

x&prime / &prime / = f (t, x) (0.1)

and the solutions 1 and t of x&prime / &prime / = 0. More specifically, the existence of a solution of (0.1) asymptotic to x(t) = at + b, a, b &isin / R has been obtained.

In this thesis we investigate in a systematic way the asymptotic behavior as t &rarr / &infin / of solutions of a class of differential equations of the form

(p(t)x&prime / )&prime / + q(t)x = f (t, x), t &ge / t_0 (0.2)
and

(p(t)x&prime / )&prime / + q(t)x = g(t, x, x&prime / ), t &ge / t_0 (0.3)

by the help of principal u(t) and nonprincipal v(t) solutions of the corresponding homogeneous equation

(p(t)x&prime / )&prime / + q(t)x = 0, t &ge / t_0. (0.4)

Here, t_0 &ge / 0 is a real number, p &isin / C([t_0,&infin / ), (0,&infin / )), q &isin / C([t_0,&infin / ),R), f &isin / C([t_0,&infin / ) &times / R,R) and g &isin / C([t0,&infin / ) &times / R &times / R,R).

Our argument is based on the idea of writing the solution of x&prime / &prime / = 0 in terms of principal and nonprincipal solutions as x(t) = av(t) + bu(t), where v(t) = t and u(t) = 1.

In the proofs, Banach and Schauder&rsquo / s fixed point theorems are used. The compactness of the operator is obtained by employing the compactness criteria of Riesz and Avramescu.

The thesis consists of three chapters. Chapter 1 is introductory and provides statement of the problem, literature review, and basic definitions and theorems.

In Chapter 2 first we deal with some asymptotic relationships between the solutions of (0.2) and the principal u(t) and nonprincipal v(t) solutions of (0.4). Then we present existence of a monotone positive solution of (0.3) with prescribed asimptotic behavior.

In Chapter 3 we introduce the existence of solution of a singular boundary value problem to the Equation (0.2).

Identiferoai:union.ndltd.org:METU/oai:etd.lib.metu.edu.tr:http://etd.lib.metu.edu.tr/upload/12615405/index.pdf
Date01 January 2013
CreatorsErtem, Turker
ContributorsZafer, Agacik
PublisherMETU
Source SetsMiddle East Technical Univ.
LanguageEnglish
Detected LanguageEnglish
TypePh.D. Thesis
Formattext/pdf
RightsAccess forbidden for 1 year

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