| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 1899802 | Physica D: Nonlinear Phenomena | 2010 | 5 Pages |
We consider the sharp interface limit ϵ→0+ϵ→0+ of the semilinear wave equation □u+∇W(u)/ϵ2=0 in R1+nR1+n, where u takes values in RkRk, k=1,2k=1,2, and WW is a double-well potential if k=1k=1 and vanishes on the unit circle and is positive elsewhere if k=2k=2. For fixed ϵ>0ϵ>0 we find some special solutions, constructed around minimal surfaces in RnRn. In the general case, under some additional assumptions, we show that the solutions converge to a Radon measure supported on a time-like kk-codimensional minimal submanifold of the Minkowski space–time. This result holds also after the appearance of singularities, and enforces the observation made by J. Neu that this semilinear equation can be regarded as an approximation of the Born–Infeld equation.
