Optimal Control of Distributed Systems with Conjugation Conditions
This work develops the methodology according to which classes of discontinuous functions are used in order to investigate a correctness of boundary-value and initial boundary-value problems for the cases with elliptic, parabolic, pseudoparabolic, hyperbolic, and pseudohyperbolic equations and with e...
| Main Authors: | , |
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| Corporate Author: | |
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| Format: | Electronic eBook |
| Language: | English |
| Published: |
Boston, MA :
Springer US,
2005.
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| Series: | Nonconvex Optimization and Its Applications,
75 |
| Subjects: | |
| Online Access: | Full Text via HEAL-Link |
Table of Contents:
- Control of Systems Described by Elliptic-Type Partial-Differential Equations under Conjugation Conditions
- Control of a Conditionally Correct System Described by the Neumann Problem for an Elliptic-Type Equation under Conjugation Conditions
- Control of a System Described by a One-Dimensional Quartic Equation under Conjugation Conditions
- Control of a System Described by a Two-Dimensional Quartic Equation under Conjugation Conditions
- Control of a System Described by a Parabolic Equation under Conjugation Conditions
- Control of a System Described by a Parabolic Equation in the Presence of Concentrated Heat Capacity
- Control of a System Described by a Pseudoparabolic Equation under Conjugation Conditions
- Control of a System Described by a Hyperbolic Equation under Conjugation Conditions
- Control of a System Described by a Pseudohyperbolic Equation under Conjugation Conditions
- Optimal Control of a Deformed Complicated Solid Body State.
