Singular perturbations of variational problems arising from a two-phase transition model

Given that, are two Lipschitz continuous functions of to ₊ and thatf(x, u, p) is a continuous function of × × ^N to [0, + [ such that, for everyx, f(x,·, 0) reaches its minimum value 0 at exactly two points(x) and(x), we prove the convergence ofF(u) = (1/)f (x, u, Du) dx when the perturbation parameter goes to zero. A formula is given for the limit functional and a general minimal interface criterium is deduced for a wide class of two-phase transition models. Earlier results of [19], [21], and [22] are extended with new proofs.