Inverse Spectral Problems for Linear Differential Operators and Their Applications
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€291.40
A01=V A Yurko
Adjoint Pair
advanced spectral recovery techniques
Ao I
Author_V A Yurko
Biorthogonal Basis
Category=PBKJ
Category=PBW
Cauchy Problem
Contour Integral Method
Discrete Inverse Problems
elasticity theory applications
Entire Analytic Function
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Form Ation
FSS.
Green's Function
Green’s Function
Higher Order Differential Operators
Higher Order Partial Differential Equations
integrable coefficients
Integro Differential Operators
Inverse Problem
Inverse Spectral Problems
Jost Solution
Linear Algebraic System
Linear Bounded Operator
Linear Differential Operators
Meromorphic Functions
non-self-adjoint operators
Piecewise Analytic Functions
Riesz Basis
spectral analysis methods
stability of inverse solutions
Sturm Liouville Operator
uniqueness in differential equations
Uniqueness Theorem
Weyl Functions
Product details
- ISBN 9789056991890
- Weight: 720g
- Dimensions: 178 x 254mm
- Publication Date: 18 Jan 2000
- Publisher: Taylor & Francis Inc
- Publication City/Country: US
- Product Form: Hardback
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Aims to construct the inverse problem theory for ordinary non-self-adjoint differential operators of arbitary order on the half-line and on a finite interval. The book consists of two parts: in the first part the author presents a general inverse problem of recovering differential equations with integrable coefficients when the behaviour of the spectrum is arbitrary. The Weyl matrix is introduced and studied as a spectral characteristic. The second part of the book is devoted to solving incomplete inverse problems when a priori information about the operator or its spectrum is available and these problems are significant in applications.
Yurko, V A
