Numerical Homogenization by Localized Decomposition

Released on by Axel Målqvist
preview-18

  • Numerical Homogenization by Localized Decomposition Book Detail

  • Author : Axel Målqvist
  • Release Date : 2020-11-23
  • Publisher : SIAM
  • Genre : Mathematics
  • Pages : 120
  • ISBN 13 : 1611976456
  • File Size : 79,79 MB
DOWNLOAD BOOK

Numerical Homogenization by Localized Decomposition by Axel Målqvist PDF Summary

Book Description: This book presents the first survey of the Localized Orthogonal Decomposition (LOD) method, a pioneering approach for the numerical homogenization of partial differential equations with multiscale data beyond periodicity and scale separation. The authors provide a careful error analysis, including previously unpublished results, and a complete implementation of the method in MATLAB. They also reveal how the LOD method relates to classical homogenization and domain decomposition. Illustrated with numerical experiments that demonstrate the significance of the method, the book is enhanced by a survey of applications including eigenvalue problems and evolution problems. Numerical Homogenization by Localized Orthogonal Decomposition is appropriate for graduate students in applied mathematics, numerical analysis, and scientific computing. Researchers in the field of computational partial differential equations will find this self-contained book of interest, as will applied scientists and engineers interested in multiscale simulation.

Disclaimer: www.yourbookbest.com does not own Numerical Homogenization by Localized Decomposition books pdf, neither created or scanned. We just provide the link that is already available on the internet, public domain and in Google Drive. If any way it violates the law or has any issues, then kindly mail us via contact us page to request the removal of the link.

Multiscale Model Reduction

Multiscale Model Reduction

File Size : 74,74 MB
Total View : 547 Views
DOWNLOAD

This monograph is devoted to the study of multiscale model reduction methods from the point of view of multiscale finite element methods. Multiscale numerical m