7 edition of **Optimal Control of Viscous Flow** found in the catalog.

- 123 Want to read
- 38 Currently reading

Published
**January 1, 1987**
by Society for Industrial Mathematics
.

Written in English

- Flow, turbulence, rheology,
- Fluid mechanics,
- Mathematics for scientists & engineers,
- Viscous flow,
- Navier-Stokes equations,
- Technology & Industrial Arts,
- Science/Mathematics,
- Material Science,
- Science / Mechanics / Dynamics / Fluid Dynamics,
- Mathematics,
- Control theory

The Physical Object | |
---|---|

Format | Paperback |

Number of Pages | 210 |

ID Numbers | |

Open Library | OL8271830M |

ISBN 10 | 0898714060 |

ISBN 10 | 9780898714067 |

OCLC/WorldCa | 39116286 |

G. Wang and L. Wang, Maximum principle of state-constrained optimal control governed by fluid dynamic systems,, Nonlinear Anal., 52 (), doi: /SX(02) Google Scholar [5] H. Liu, Optimal control problems with state constraint governed by Navier-Stokes equations,, Nonlinear Anal., 73 (), He has more than 40 years of experience and has written more than 10 books and articles about flow measurement, instrumentation and process control. Spitzer may be reached at or via Click on the “Products” tab to find his Consumer Guides to various flow and level measurement technologies.

Necessary and sufficient conditions for optimal controls in viscous flow problems - Volume Issue 2 - H. O. Fattorini, S. S. Sritharan. The objective of this study was to propose methods for the optimal design of viscous or friction/hysteretic dampers in structures subjected to seismic and other dynamic loads. The systems investigated to control the dynamic response of the structure included passive linear viscous dampers, constant slip force friction dampers, and semi-active variable slip force friction dampers of the Off-On.

Fluid flow in casting rigging systems: Modeling, validation, and optimal design Metallurgical and Materials Transactions B, Vol. 29, No. 3 Wing Section Optimization for Supersonic Viscous Flow. The book's wide scope (including inviscid and viscous flows, waves in fluids, boundary layer flow, and instability in flow) and frequent references to experiments and the history of the subject, ensures that this book provides a comprehensive and absorbing introduction to the mathematical study of fluid behaviour.

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Optimal control of viscous flow S S Sritharan, Society for Industrial and Applied Mathematics Optimal control of fluid dynamics is of fundamental importance in aero/hydrodynamic vehicles, combustion control in engines, fire suppression, magnetic fusion, and ocean and atmospheric prediction.

Keywords: optimal control, viscous flow, Navier-Stokes equations, dual dynamic programming, fluid dynamics - Hide Description Optimal control of fluid dynamics is of fundamental importance in aero/hydrodynamic vehicles, combustion control in engines, fire suppression, magnetic fusion, and ocean and atmospheric prediction.

Optimal control of fluid dynamics is of fundamental importance in aero/hydrodynamic vehicles, combustion control in engines, fire suppression, magnetic fusion, and ocean and atmospheric prediction. This book provides a well-crystalized theory and computational methods for this new field.

Optimal control of viscous flow. [S S Sritharan;] Home. WorldCat Home About WorldCat Help. Search. Search for Library Items Search for Lists Search for Contacts Book, Internet Resource: All Authors / Contributors: S S Sritharan. Find more information about:. Translated by L.K. PMM U.S.S.R.,VolNo.6,pp, /84 $+ Printed in Great Britain Pergamon Press Ltd.

ON THE OPTIMAL CONTROL OF VISCOUS INCOMPRESSIBLE FLUID FLOW* M.A. BRUTY and P.L. KRAPIVSKII The framework of the Navier-Stokes (N-S) equations is used to study flow past an arbitrary body on whose surface the Cited by: 2. For a numerical example of the present optimal control method, fluid force reduction problem of a sphere located in the viscous flow is calculated.

The control points are put on the surface of the sphere, and the control velocities are imposed on the control points in the direction of stream line. The calculation conditions is shown in Figure. : Shuji Nakajima, Mutsuto Kawahara.

The control of complex, unsteady flows is a pacing technology for advances in fluid mechanics. Recently, optimal control theory has become popular as a means of predicting best case controls that.

We study an optimal control problem for the mathematical model that describes steady non-isothermal creeping flows of an incompressible fluid through a locally Lipschitz bounded domain. The control parameters are the pressure and the temperature on the in-flow and out-flow parts of the boundary of the flow domain.

We propose the weak formulation of the problem and prove the existence of weak Cited by: 2. Optimal control problems of viscous flow.

In World Congress of Nonlinear Analysts ' Proceedings of the First World Congress of Nonlinear Analysts, Tampa, Florida, August(pp. Abstract. In this article we review some of the recent results in the mathematical theory of optimal feedback control of viscous flow. Main results are existence of ordinary and chattering controls, Pontryagin maximum principle and feedback synthesis using infinite dimensional Hamilton-Jacobi equation of dynamic programming.

The optimal control of the viscous Camassa-Holm equation under boundary condition is given and the existence of optimal solution to the viscous Camassa-Holm equation is proved. View Show abstract. Optimal control theory of viscous flow has many important applications in engineering science.

During the past few years several fundamental advances have been reported for flow control problems with convex cost. The main questions addressed were the existence theorem. Citation: Theodore Tachim-Medjo. Optimal control of a two-phase flow model with state constraints.

Mathematical Control & Related Fields,6 (2): doi: /mcrf COVID Resources. Reliable information about the coronavirus (COVID) is available from the World Health Organization (current situation, international travel).Numerous and frequently-updated resource results are available from this ’s WebJunction has pulled together information and resources to assist library staff as they consider how to handle coronavirus.

4 Sritharan SS (ed.). Optimal Control of Viscous Flow. SIAM: Philadelphia, PA, (This is a collection of papers on early eﬀorts in mathematical techniques for optimal control of Navier–Stokes equations).

5 Gunzburger MD (ed.). Flow Control. Springer: Berlin, 6 Meier GEA, Schnerr GH (eds). Control of Flow Instabilities and Unsteady. If you own the copyright to this book and it is wrongfully on our website, we offer a simple DMCA procedure to remove your content from our site. DOWNLOAD DJVU.

Optimal Control of Viscous Flow. Read more. Viscous Flow. Read more. Viscous flow. Read more. Viscous Fluid Flow. Read more. Viscous Fluid Flow. Read more. Viscous Fluid Flow. Read. N.J. Cutland and K. Grzesiak, “Optimal control for 3-dimensional stochastic Navier-Stokes equations”, Stochastics and Stochastic Reports, 77 () – zbMATH MathSciNet Google Scholar [11].

This book provides a thorough treatment of the basics of flow control and control practices that can be used to produce desired effects. Among topics covered are transition delay, separation prevention, drag reduction, lift augmentation, turbulence suppression, noise abatement, and.

Optimal Boundary Control for the Nonsteady Incompressible Flow: An Application to Viscous Drag Reduction Proceedings of the 29th IEEE Conference Decision and Control, IEEE, pp.

VISCOUS FLUID FLOW Tasos C. Papanastasiou Georgios C. Georgiou Department of Mathematics and Statistics University of Cyprus Nicosia, Cyprus Andreas N.

Alexandrou Department of Mechanical Engineering Worcester Polytechnic Institute Worcester, MA by Boca Raton London New York Washington, D.C. CRC Press.

viscous ﬂuid take the differential form which are called Nav ier-Stokes equations (N-S). Father we will treat the ﬂuid as a incompressible. The vector form of N-S equations are ∂v ∂t +v∇v =− 1 ρ ∇p+ν∆v (1) ∇v =0 (2) For viscous ﬂow relation between the the vector of tension t(x,t) is not like for ideal (invicid).American Institute of Aeronautics and Astronautics Sunrise Valley Drive, Suite Reston, VA Optimal boundary control for nonstationary problems of fluid flow and nonhomogeneous boundary value problems for the Navier-Stokes equations ; The Cauchy problem for elliptic equations in a conditionally well-posed formulation ; The local exact controllability of the flow of incompressible viscous fluid ; Bibliography