Item type | Current location | Collection | Call number | Copy number | Status | Date due | Barcode |
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E-Books | Biblioteca da FCTUNL Online | Não Ficção | QA316.SPR FCT 96345 (Browse shelf) | 1 | Available |
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QA316.SPR FCT 94501 Turnpike properties in the calculus of variations and optimal control | QA316.SPR FCT 94595 Variational analysis and generalized differentiation II | QA316.SPR FCT 94618 Variational analysis and generalized differentiation I | QA316.SPR FCT 96345 Generalized adjoint systems | QA316.SPR FCT 96360 Turnpike theory of continuous-time linear optimal control problems | QA316.SPR FCT 96361 Intentional risk management through complex networks analysis | QA316.SPR FCT 96454 The inverse problem of the calculus of variations |
Colocação: Online
This book defines and develops the generalized adjoint of an input-output system. It is the result of a theoretical development and examination of the generalized adjoint concept and the conditions under which systems analysis using adjoints is valid. Results developed in this book are useful aids for the analysis and modeling of physical systems, including the development of guidance and control algorithms and in developing simulations. The generalized adjoint system is defined and is patterned similarly to adjoints of bounded linear transformations. Next the elementary properties of the generalized adjoint system are derived. For a space of input-output systems, a generalized adjoint map from this space of systems to the space of generalized adjoints is defined. Then properties of the generalized adjoint map are derived. Afterward the author demonstrates that the inverse of an input-output system may be represented in terms of the generalized adjoint. The use of generalized adjoints to determine bounds for undesired inputs such as noise and disturbance to an input-output system is presented and methods which parallel adjoints in linear systems theory are utilized. Finally, an illustrative example is presented which utilizes an integral operator representation for the system mapping.
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