Mass conserved Allen-Cahn equation and volume preserving mean curvature flow

Abstract

We consider a mass conserved Allen-Cahn equation ut= u+ -2 (f(u)-λ(t)) in a bounded domain with no flux boundary condition, where λ(t) is the average of f(u(·,t)) and -f is the derivative of a double equal well potential. Given a smooth hypersurface γ0 contained in the domain, we show that the solution u with appropriate initial data approaches, as 0, to a limit which takes only two values, with the jump occurring at the hypersurface obtained from the volume preserving mean curvature flow starting from γ0.