Dewey Class |
515.353 |
Titel |
Mathematical Theory of Evolutionary Fluid-Flow Structure Interactions ([EBook]) / by Barbara Kaltenbacher, Igor Kukavica, Irena Lasiecka, Roberto Triggiani, Amjad Tuffaha, Justin T. Webster. |
Verfasser |
Kaltenbacher, Barbara |
Added Personal Name |
Kukavica, Igor author. |
Lasiecka, Irena author. |
Triggiani, Roberto author. |
Tuffaha, Amjad author. |
Webster, Justin T author. |
Other name(s) |
SpringerLink (Online service) |
Veröffentl |
Cham : : Springer International Publishing : : Imprint: Birkh?ser, , 2018. |
Physical Details |
XIII, 307 p : online resource. |
Reihe |
Oberwolfach Seminars 1661-237X ; 48 |
ISBN |
9783319927831 |
Summary Note |
This book is devoted to the study of coupled partial differential equation models, which describe complex dynamical systems occurring in modern scientific applications such as fluid/flow-structure interactions. The first chapter provides a general description of a fluid-structure interaction, which is formulated within a realistic framework, where the structure subject to a frictional damping moves within the fluid. The second chapter then offers a multifaceted description, with often surprising results, of the case of the static interface; a case that is argued in the literature to be a good model for small, rapid oscillations of the structure. The third chapter describes flow-structure interaction where the compressible Navier-Stokes equations are replaced by the linearized Euler equation, while the solid is taken as a nonlinear plate, which oscillates in the surrounding gas flow. The final chapter focuses on a the equations of nonlinear acoustics coupled with linear acoustics or elasticity, as they arise in the context of high intensity ultrasound applications.: |
Contents note |
An introduction to a fluid-structure model -- Linear parabolic-hyperbolic fluid-structure interaction models -- Flow-plate interactions: well-posedness and long-time behavior -- Some aspects in nonlinear acoustics coupling and shape optimization. |
System details note |
Online access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users) |
Internet Site |
http://dx.doi.org/10.1007/978-3-319-92783-1 |
LINKS ZU 'VERWANDTEN WERKEN |
Schlagwörter: .
Mathematics .
Partial differential equations .
Authors:
Corporate Authors:
Series:
Classification:
|