On a Free Boundary Problem for a Nonlinear Coupled System of Evolution Equations of Oceanography.
On evolution Galerkin methods for the Maxwell and the linearized Euler equations
The subject of the paper is the derivation and analysis of evolution Galerkin schemes for the two dimensional Maxwell and linearized Euler equations. The aim is to construct a method which takes into account better the infinitely many directions of propagation of waves. To do this the initial function is evolved using the characteristic cone and then projected onto a finite element space. We derive the divergence-free property and estimate the dispersion relation as well. We present some numerical...
On singularities of capillary surfaces in the absence of gravity.
On the capillarity problem with constant volume
On the derivation of homogeneous hydrostatic equations
On the derivation of homogeneous hydrostatic equations
In this paper we study the derivation of homogeneous hydrostatic equations starting from 2D Euler equations, following for instance [2,9]. We give a convergence result for convex profiles and a divergence result for a particular inflexion profile.
On the Existence and Uniqueness of Non-homogeneous Motions in Exterior Domains.
On the Exterior Capillarity Problem.
On the Height of a Capillary Surface.
On the non-uniqueness of weak solution of the Euler equations
On the solvability of a problem of stationary fluid flow in a helical pipe.