Basic HTML version of Foils prepared 27 October 1997

Foil 8 Basic Computational Structure - II

From Master Set of Foils for GEM Computational Science Presentation GEM WorkShop Santa Fe -- 24-25 October 97. by Geoffrey C. Fox
1 The Green's Function is in first approximation independent of time and time only enters through time dependence of slip deficit
2 We are evolving a set of N differential equations -- think of each fault segment "i"as a particle -and can do this either as either
  • deterministic "particle" dynamics
  • Monte Carlo
3 These are two standard choices in "ordinary" particle dynamics
4 After each time/Monte Carlo step one needs to see if a slip will occur using friction law
in Table To:

© Northeast Parallel Architectures Center, Syracuse University, npac@npac.syr.edu

If you have any comments about this server, send e-mail to webmaster@npac.syr.edu.

Page produced by wwwfoil on Mon Oct 27 1997