%0 Journal Article
%T A Conserved Phase-Field Model Based on Microconcentrations
%A Armel Judice Ntsokongo
%A Narcisse Batangouna
%A Christian Tathy
%J Applied Mathematics
%P 275-291
%@ 2152-7393
%D 2025
%I Scientific Research Publishing
%R 10.4236/am.2025.163014
%X In this article, we consider the conserved phase-field model based on microconcentrations. In particular, we prove the well-posedness to this model and then prove the convergence of the solutions to those of the classical conserved phase-field model as a small parameter goes to zero, on finite time intervals. We also prove the existence of global attractor and we finally give some numerical simulations.
%K Conserved Phase-Field Model
%K Microconcentrations
%K Neumann Boundary Conditions
%K Well-Posedness
%K Passage to the Limit
%K Global Attractor
%K Numerical Simulations
%U http://www.scirp.org/journal/PaperInformation.aspx?PaperID=141676