A note on solutions of nonlinear equations with singular Jacobian matrices

Given 0 any open and bounded subset of R n , n 4, with smooth boundary and given 7 any (n&m)-dimensional compact submanifold of 0 without boundary, n>m>2, we prove the existence of weak solutions to the problem &2u=u p in 0 { u>0 in 0 u=0 on 0, which are singular on 7, when p is a real p>mÂ(m&2), c

The singularity of the jacobian, recently claimed by Cans to result in the extremal property that infinite values be taken by the partial derivatives of aU the diagonal for;z constants w%h respect to any gi%vven off-diagonai force constant, is shown to be consistent with finite values of all the par

We consider the nonlinear singular differential equation where µ and σ are two positive Radon measures on 0 ω not charging points. For a regular function f and under some hypotheses on A, we prove the existence of an infinite number of nonnegative solutions. Our approach is based on the use of the