Blowing up solutions of semilinear P.D.E. with convex potentials
Abstract
We consider convex potentials W: [0,∞) vanishing at 0 and growing sufficiently fast at ∞. Given any open set ⊂n with Lipschitz and compact boundary, we prove the existence and uniqueness of a solution of u= W'(u) in , such that u=+∞ or u=-∞ on ∂ . Moreover, if ∂ is the union of two disjoint compact subsets A+ and A-, there also exists a unique solution satisfying u=+∞ on A+ and u=-∞ on A-.
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