This paper is concerned with the motion of a time-dependent hypersurface partial derivative Omega(t) in R(d) that evolves with a normal velocity V(n) = kappa+g, where kappa is the mean curvature of partial derivative Omega(t), and g is an external forcing term. Phase field approximation of this motion leads to the Allen-Cahn equation partial derivative(t)u = Delta u - 1/epsilon(2)W'(u)+1/epsilon c(W)g, where epsilon is an approximation parameter, W a double well potential and c(W) a constant that depends only on W. We study here a modified version of this equation partial derivative(t)u = Delta u-1/epsilon(2)W'(u)+1/epsilon root 2W(u)g and we prove its convergence to the same geometric motion. We then make use of this modified equation in the context of mean curvature flow with conservation of the volume, and we show that it has better volume-preserving properties than the traditional nonlocal Allen-Cahn equation.

• 出版日期2011-7-15