Description This monograph provides a comprehensive treatment of expansion theorems for regular systems of first order differential equations and n-th order ordinary differential equations.
In 10 chapters and one appendix, it provides a comprehensive treatment from abstract
foundations to applications in physics and engineering. The focus is on non-self-adjoint problems. Bounded operators are associated to
these problems, and Chapter 1 provides an in depth investigation of eigenfunctions and associated functions for bounded Fredholm valued
operators in Banach spaces. Since every n-th order differential equation is equivalent
to a first order system, the main techniques
are developed for systems. Asymptotic fundamental
systems are derived for a large class of systems of differential equations. Together
with boundary
conditions, which may depend polynomially on the eigenvalue parameter, this leads to the definition of Birkhoff and Stone
regular eigenvalue problems. An effort is made to make the conditions relatively easy verifiable; this is illustrated with several applications
in chapter 10.
The contour integral method and estimates of the resolvent are used to prove expansion theorems.
For Stone regular problems,
not all functions are expandable, and again relatively easy verifiable
conditions are given, in terms of auxiliary boundary conditions,
for functions to be expandable.
Chapter 10 deals exclusively with applications; in nine sections, various concrete problems such as
the Orr-Sommerfeld equation, control of multiple beams, and an example from meteorology are investigated.
Key features:
• Expansion
Theorems for Ordinary Differential Equations • Discusses Applications to Problems from Physics and Engineering • Thorough
Investigation of Asymptotic Fundamental Matrices and Systems • Provides a Comprehensive Treatment • Uses the Contour
Integral Method • Represents the Problems as Bounded Operators • Investigates Canonical Systems of Eigen- and Associated
Vectors for Operator Functions
Contents Contents.
Introduction.
CHAPTER I: Operator functions in Banach spaces.
CHAPTER II: First order systems of ordinary differential
equations.
CHAPTER III: Boundary eigenvalue problems for first order systems.
CHAPTER IV: Birkhoff regular and Stone regular
boundary eigenvalue problems.
CHAPTER V: Expansion theorems for regular boundary eigenvalue problems for first order systems.
CHAPTER VI: n-th order differential equations.
CHAPTER VII: Regular boundary eigenvalue problems for n-th
order equations.
CHAPTER VIII: The differential equation Kn = λHn
CHAPTER IX: n-th order differential equations
and n-fold expansions.
CHAPTER X: Applications.
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