Includes bibliographical references (p. 121-126) and index.
|Series||Wiley-Teubner series, advances in numerical mathematics|
|LC Classifications||QA297 .V45 1996|
|The Physical Object|
|Pagination||vi, 127 p. :|
|Number of Pages||127|
|ISBN 10||0471967955, 3519026058|
|LC Control Number||99204529|
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 . Self-adaptive discretization methods are now an indispensable tool for the numerical solution of partial differential equations that arise from physical and technical applications. The aim is to obtain a numerical solution within a prescribed tolerance using a minimal amount of work. The main Pages: The first numerical example is of an elasto-plastic solid mechanics problem chosen to illustrate the concepts of adaptive mesh refinement together with the data transfer procedure in plasticity problems. An elasto-plastic L-shape with its geometry and material properties presented in Figure is numerically analyzed. Material parameters pertinent to the von-Mises yield criterion. tional techniques is the use of parallel processing for both solution procedures and adaptive mesh refinement. High speed, multi-processor computers can return solutions in a fraction of the time needed by serial computers. An important issue in adaptive mesh refinement is to establish the quality of the so-.
A 'read' is counted each time someone views a publication summary (such as the title, abstract, and list of authors), clicks on a figure, or views or downloads the full-text. Acknowledgments. This research was partly supported by the Ministry of Education, Youth, and Sports of the Czech Republic through Research Center 1M, by the Grant Agency of the Academy of Sciences of the Czech Republic through Grant IAA , and by the Academy of Sciences of the Czech Republic through Research Plan AV0ZCited by: Element residual method Subdomain residual method File Size: KB. Montseny, E., Pernet, S., Ferriéres, X., Cohen, G.: Dissipative terms and local time-stepping improvements in a spatial high order Discontinuous Galerkin scheme for Cited by: 3.
This work was supported by NSF grants DGE and ACI, DOE grant DG-FGER, and the Alfred P. Sloan by: 1. Self-adaptive discretization methods are now an indispensable tool for the numerical solution of partial differential equations that arise from physical and technical applications. 46th AIAA Fluid Dynamics Conference Washington, D.C. 46th AIAA Fluid Dynamics Conference American Institute of Aeronautics and Astronautics Reston, Virginia, ()., (). 97Cited by: Self-adaptive discretization methods are now an indispensable tool for the numerical solution of partial differential equations that .