The resolution of generic analytic differential model (MOAD) is treated, defining 2 numerical proceedings with which are calculated alternately the same discrete values of the solution of a MOAD. On is the method of the elements with infinitesimal size (MEEI), the second consists in the method of the elements with finite size (MEEF) with which are calculated mean values, followed by the method of calculation of corresponding punctual values (MCPN). The MEEI and MCPN are obtained on the whole in the context of the standard mathematical analysis (AS), rather the MEEF is a result essentially proper of the new thermodynamics of equilibrium (NTE), compatible neither with the ASI nor with the interpretation (ASI) of this but only with the analysis AN, being the ASI and AN of the NTE. Particularly is notable that the MEEF+MCPN doesn't induce the error of discretization typical of the numerical proceedings of resolution of MOAD. Finally the 2 MOAD previously indicated in  for physical systems in which are present more physical substances are better circumstances.
|Pages (from-to)||113 - 145|
|Number of pages||33|
|Publication status||Published - 1995|
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