A two-scale model for the periodic homogenization of the wave equation

In this paper, we consider numerical homogenization of acoustic wave equations with heterogeneous coefficients, namely, when the bulk modulus and the density of the medium are only bounded. We show that under a Cordes type condition the second order derivatives of the solution with respect to harmon

A series of papers'-5 dealing with the wave equation formulation of the continuity equation has shown that this procedure is superior to the standard primitive equation method for simulating shallow water flow problems by the finite element method. However, the analysis of the numerical algorithms h

## 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

We employ elliptic regularization and monotone method. We consider X⊂R n (n 1) an open bounded set that has regular boundary C and Q = X×(0,T), T>0, a cylinder of R n+1 with lateral boundary R = C×(0,T).

In this paper we study the asymptotic behaviour of the wave equation with rapidly oscillating coefficients in a two-component composite with ε-periodic imperfect inclusions. We prescribe on the interface between the two components a jump of the solution proportional to the conormal derivatives throu