An ordering principle for discontinuous solutions of quasi-linear equations

Let be either a ball or an annulus centered about the origin in N and p the usual p-Laplace operator in β ∈ 0 1 be any two radial weak solutions ofp u i = b u i + f i in . We then show that u 1 ≤ u 2 in implies u 1 < u 2 in and also that appropriate versions of Hopf boundary point principle hold.

In this paper we consider the nonlinear third-order quasi-linear differential equation and obtain some simple conditions for the existence of a periodic solution for it. In so doing we use the implicit function theorem to prove a theorem about the existence of periodic solutions and consider one ex

We present a quasi maximum principle stating roughly that holomorphic solutions of a given partial differential equation with constant coefficents in C n , achieve essentially their maximal growth on a certain algebraic hypersurface 1 related to the operator. We prove it in the case where P is homo