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Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
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Bester Preis: € 5,10 (vom 21.10.2019)Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783540204060 bzw. 3540204067, in Deutsch, Springer, Taschenbuch, neu.
Paperback. 293 pages. Dimensions: 9.1in. x 6.1in. x 1.0in.During the last decade essential progress has been achieved in the analysis and implementation of multilevelrnultigrid and domain decomposition methods to explore a variety of real world applications. An important trend in mod ern numerical simulations is the quick improvement of computer technology that leads to the well known paradigm (see, e. g. , 78, 179): high-performance computers make it indispensable to use numerical methods of almost linear complexity in the problem size N, to maintain an adequate scaling between the computing time and improved computer facilities as N increases. In the h-version of the finite element method (FEM), the multigrid iteration real izes an O(N) solver for elliptic differential equations in a domain n c IRd d with N O(h- ) , where h is the mesh parameter. In the boundary ele ment method (BEM) , the traditional panel clustering, fast multi-pole and wavelet based methods as well as the modern hierarchical matrix techniques are known to provide the data-sparse approximations to the arising fully populated stiffness matrices with almost linear cost O(Nr logNr), where 1 d Nr O(h - ) is the number of degrees of freedom associated with the boundary. The aim of this book is to introduce a wider audience to the use of a new class of efficient numerical methods of almost linear complexity for solving elliptic partial differential equations (PDEs) based on their reduction to the interface. This item ships from multiple locations. Your book may arrive from Roseburg,OR, La Vergne,TN.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783642187773 bzw. 3642187773, vermutlich in Englisch, Springer Shop, neu, E-Book, elektronischer Download.
During the last decade essential progress has been achieved in the analysis and implementation of multilevel/rnultigrid and domain decomposition methods to explore a variety of real world applications. An important trend in mod ern numerical simulations is the quick improvement of computer technology that leads to the well known paradigm (see, e. g. , [78,179]): high-performance computers make it indispensable to use numerical methods of almost linear complexity in the problem size N, to maintain an adequate scaling between the computing time and improved computer facilities as N increases. In the h-version of the finite element method (FEM), the multigrid iteration real izes an O(N) solver for elliptic differential equations in a domain n c IRd d with N = O(h- ) , where h is the mesh parameter. In the boundary ele ment method (BEM) , the traditional panel clustering, fast multi-pole and wavelet based methods as well as the modern hierarchical matrix techniques are known to provide the data-sparse approximations to the arising fully populated stiffness matrices with almost linear cost O(Nr log?Nr), where 1 d Nr = O(h - ) is the number of degrees of freedom associated with the boundary. The aim of this book is to introduce a wider audience to the use of a new class of efficient numerical methods of almost linear complexity for solving elliptic partial differential equations (PDEs) based on their reduction to the interface. eBook.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface (Paperback)
ISBN: 9783540204060 bzw. 3540204067, in Deutsch, Springer, Berlin/Heidelberg, Deutschland, Taschenbuch, neu, Erstausgabe.
Paperback. This is the first book that deals systematically with the numerical solution of elliptic partial differential equations by their reduction to the interface via the Sc.Shipping may be from our UK, US or Australian warehouse depending on stock availability. This item is printed on demand. 293 pages. 0.445.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783540204060 bzw. 3540204067, vermutlich in Englisch, Springer, Berlin/Heidelberg, Deutschland, neu.
During the last decade essential progress has been achieved in the analysis and implementation of multilevel/rnultigrid and domain decomposition methods to explore a variety of real world applications. An important trend in mod ern numerical simulations is the quick improvement of computer technology that leads to the well known paradigm (see, e. g. , [78,179]): high-performance computers make it indispensable to use numerical methods of almost linear complexity in the problem size N, to maintain an adequate scaling between the computing time and improved computer facilities as N increases. In the h-version of the finite element method (FEM), the multigrid iteration real izes an O(N) solver for elliptic differential equations in a domain n c IRd d with N = O(h- ) , where h is the mesh parameter. In the boundary ele ment method (BEM) , the traditional panel clustering, fast multi-pole and wavelet based methods as well as the modern hierarchical matrix techniques are known to provide the data-sparse approximations to the arising fully populated stiffness matrices with almost linear cost O(Nr log?Nr), where 1 d Nr = O(h - ) is the number of degrees of freedom associated with the boundary. The aim of this book is to introduce a wider audience to the use of a new class of efficient numerical methods of almost linear complexity for solving elliptic partial differential equations (PDEs) based on their reduction to the interface.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783642187773 bzw. 3642187773, vermutlich in Englisch, Springer Berlin Heidelberg, neu, E-Book, elektronischer Download.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface: During the last decade essential progress has been achieved in the analysis and implementation of multilevel/rnultigrid and domain decomposition methods to explore a variety of real world applications. An important trend in mod- ern numerical simulations is the quick improvement of computer technology that leads to the well known paradigm (see, e. g. , [78,179]): high-performance computers make it indispensable to use numerical methods of almost linear complexity in the problem size N, to maintain an adequate scaling between the computing time and improved computer facilities as N increases. In the h-version of the finite element method (FEM), the multigrid iteration real- izes an O(N) solver for elliptic differential equations in a domain n c IRd d with N = O(h- ) , where h is the mesh parameter. In the boundary ele- ment method (BEM) , the traditional panel clustering, fast multi-pole and wavelet based methods as well as the modern hierarchical matrix techniques are known to provide the data-sparse approximations to the arising fully populated stiffness matrices with almost linear cost O(Nr log Nr), where 1 d Nr = O(h - ) is the number of degrees of freedom associated with the boundary. The aim of this book is to introduce a wider audience to the use of a new class of efficient numerical methods of almost linear complexity for solving elliptic partial differential equations (PDEs) based on their reduction to the interface. Englisch, Ebook.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783540204060 bzw. 3540204067, in Deutsch, Springer, Berlin, Taschenbuch, neu.
buecher.de GmbH & Co. KG, [1].
This is the first book that deals systematically with the numerical solution of elliptic partial differential equations by their reduction to the interface via the Schur complement.Inheriting the beneficial features of finite element, boundary element and domain decomposition methods, our approach permits solving iteratively the Schur complement equation with linear-logarithmic cost in the number of the interface degrees of freedom. The book presents the detailed analysis of the efficient data-sparse approximation techniques to the nonlocal Poincaré-Steklov interface operators associated with the Laplace, biharmonic, Stokes and Lamé equations. Another attractive topic are the robust preconditioning methods for elliptic equations with highly jumping, anisotropic coefficients. A special feature of the book is a unified presentation of the traditional iterative substructuring and multilevel methods combined with modern matrix compression techniques applied to the Schur complement on the interface.2004. xi, 293 S. 14 Tabellen,Versandfertig in 3-5 Tagen, Softcover.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783642187773 bzw. 3642187773, in Deutsch, Springer Nature, neu, E-Book.
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Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783540204060 bzw. 3540204067, in Deutsch, Springer, Berlin/Heidelberg, Deutschland.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface.
Numerical Solution of Elliptic Differential Equations by Reduction to the Interface
ISBN: 9783642187773 bzw. 3642187773, in Englisch, Springer Berlin Heidelberg, neu, E-Book, elektronischer Download.