A Maximum Principle for Periodic Solutions of the Telegraph Equation

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

In this work we present a comparison result for two solutions of the Laplace equation in a smooth bounded domain, satisfying the same mixed boundary condition (zero Dirichlet data on part of the boundary and zero Neumann data on the rest). The result is in some sense a generalization of the Hopf lem

## Abstract We are concerned with the Ostrovsky equation, which is derived from the theory of weakly nonlinear long surface and internal waves in shallow water under the presence of rotation. On the basis of the variational method, we show the existence of periodic traveling wave solutions. Copyrig