On the behavior of solutions of quasilinear elliptic inequalities near a boundary point

Abstract

Assume that p > 1 and p - 1 α p are real numbers and is a non-empty open subset of Rn, n 2. We consider the inequality div \, A (x, D u) + b (x) |D u|α 0, where D = (∂ / ∂ x1, …, ∂ / ∂ xn) is the gradient operator and A : × Rn Rn and b : [0, ∞) are some functions with C1 ||p A (x, ), |A (x, )| C2 ||p-1, C1, C2 = const > 0, for almost all x ∈ and for all ∈ Rn. For solutions of this inequality we obtain estimates depending on the geometry of . In particular, these estimates imply regularity conditions of a boundary point.