C Pde

Geometric Asymptotics for Nonlinear PDE. I  eBooks & eLearning

Posted by DZ123 at Jan. 25, 2018
Geometric Asymptotics for Nonlinear PDE. I

V. P. Maslov and G. A. Omel'yanov, "Geometric Asymptotics for Nonlinear PDE. I"
English | 2001 | ISBN: 0821821091 | PDF | pages: 296 | 17.1 mb

PDE Solutions FlexPDE 7.07  Software

Posted by scutter at Oct. 16, 2017
PDE Solutions FlexPDE 7.07

PDE Solutions FlexPDE 7.07 | 36.7 mb

PDE Solutions Inc. has released FlexPDE 7.07, is a general-purpose software for obtaining numerical solutions to partial differential equations in 2 or 3 dimensions. It is based on the Finite Element Method. FlexPDE can solve steady-state or time-dependent problems; eigenvalue analysis; and free boundary problems.

Multi-Scale and High-Contrast PDE  eBooks & eLearning

Posted by nebulae at Oct. 1, 2017
Multi-Scale and High-Contrast PDE

Habib Ammari, Yves Capdeboscq, Hyeonbae Kang, "Multi-Scale and High-Contrast PDE"
English | ISBN: 0821869299 | 2012 | 154 pages | PDF | 2 MB
Mesh Dependence in PDE-Constrained Optimisation: An Application in Tidal Turbine Array Layouts

Mesh Dependence in PDE-Constrained Optimisation: An Application in Tidal Turbine Array Layouts By Tobias Schwedes, David A. Ham, Simon W. Funke, Matthew D. Piggott
English | PDF | 2017 | 118 Pages | ISBN : 3319594826 | 4.76 MB

This book provides an introduction to PDE-constrained optimisation using finite elements and the adjoint approach. The practical impact of the mathematical insights presented here are demonstrated using the realistic scenario of the optimal placement of marine power turbines, thereby illustrating the real-world relevance of best-practice Hilbert space aware approaches to PDE-constrained optimisation problems.

The Heston Model and Its Extensions in Matlab and C# (repost)  eBooks & eLearning

Posted by roxul at June 14, 2017
The Heston Model and Its Extensions in Matlab and C# (repost)

Fabrice D. Rouah, "The Heston Model and Its Extensions in Matlab and C#"
2013 | ISBN-10: 1118548256 | 432 pages | PDF | 18 MB
Level Set and PDE Based Reconstruction Methods in Imaging: Cetraro, Italy 2008, Editors: Martin Burger, Stanley Osher(Repost)

Level Set and PDE Based Reconstruction Methods in Imaging: Cetraro, Italy 2008, Editors: Martin Burger, Stanley Osher by Martin Burger
English | 2013 | ISBN: 331901711X | 319 Pages | PDF | 5.26 MB

Solving PDEs in C++ (Repost)  eBooks & eLearning

Posted by DZ123 at Jan. 8, 2017
Solving PDEs in C++ (Repost)

Yair Shapira, "Solving PDEs in C++"
English | 2006 | ISBN: 0898716012 | PDF | pages: 525 | 2.7 mb
Tools for PDE: Pseudodifferential Operators, Paradifferential Operators, and Layer Potentials

Tools for PDE: Pseudodifferential Operators, Paradifferential Operators, and Layer Potentials by Michael E. Taylor
English | 17 Aug. 2000 | ISBN: 0821826336 | 257 Pages | PDF | 17 MB

This book develops three related tools that are useful in the analysis of partial differential equations, arising from the classical study of singular integral operators: pseudodifferential operators, paradifferential operators, and layer potentials. A theme running throughout the work is the treatment of PDE in the presence of relatively little regularity.

A Tutorial on Elliptic Pde Solvers and Their Parallelization  eBooks & eLearning

Posted by leonardo78 at Oct. 24, 2016
A Tutorial on Elliptic Pde Solvers and Their Parallelization

A Tutorial on Elliptic Pde Solvers and Their Parallelization by Craig C. Douglas, Gundolf Haase, Ulrich Langer
Publisher: Society for Industrial & Applied | 2003 | ISBN: 0898715415 | 135 pages | PDF | 13,8 MB

This compact yet thorough tutorial is the perfect introduction to the basic concepts of solving partial differential equations (PDEs) using parallel numerical methods. In just eight short chapters, the authors provide readers with enough basic knowledge of PDEs, discretization methods, solution techniques, parallel computers, parallel programming, and the run-time behavior of parallel algorithms to allow them to understand, develop, and implement parallel PDE solvers.
Geometric Properties for Parabolic and Elliptic PDE's: GPPEPDEs, Palinuro, Italy, May 2015 (Repost)

Gazzola, F., Ishige, K., Nitsch, C., Salani, P., "Geometric Properties for Parabolic and Elliptic PDE's: GPPEPDEs, Palinuro, Italy, May 2015"
English | 2016 | ISBN-10: 3319415360 | 288 pages | pdf | 3.61 MB