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The theory of differential-operator equations is one of two modern theories for the study of both ordinary and partial differential equations, with numerous applications in mechanics and theoretical physics. Although a number of published works address differential-operator equations of the first and second orders, to date none offer a treatment of the higher orders.
In Differential-Operator Equations, the authors present a systematic treatment of the theory of differential-operator equations of higher order, with applications to partial differential equations. They construct a theory that allows application to both regular and irregular differential problems. In particular, they study problems that cannot be solved by various known methods and irregular problems not addressed in existing monographs. These include Birkhoff-irregularity, non-local boundary value conditions, and non-smoothness of the boundary of the domains.
Among this volume's other points of interest are:
The Abel basis property of a system of root functions
Irregular boundary value problems
The theory of hyperbolic equations in Gevrey space
The theory of boundary value problems for elliptic differential equations with a parameter
Table of Contents
Introduction Auxiliary Results Completeness and the Abel Basis Property of a System of Root Vectors Principally Boundary Value Problems for Ordinary Differential Equations with a Polynomial Parameter Principally Regular Elliptic Boundary Value Problems with a Polynomial Parameter Elliptic Differential-Operator Equations Hyperbolic Differential-Operator Equations Parabolic Differential-Operator Equations Well-Posed Problems for Partial Differential Equations Problems Reference Notes References List of Notations Subject Index Author Index