Boundary singularities of solutions to elliptic viscous Hamilton-Jacobi equations
Abstract
We study the boundary value problem with measures for (E1) - u+g(|∇ u|)=0 in a bounded domain in N, satisfying (E2) u= on and prove that if g∈ L1(1,∞;t-(2N+1)/Ndt) is nondecreasing (E1)-(E2) can be solved with any positive bounded measure. When g(r)≥ rq with q>1 we prove that any positive function satisfying (E1) admits a boundary trace which is an outer regular Borel measure, not necessarily bounded. When g(r)=rq with $1
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