Multiple Vortices for the Shallow Water Equation

Abstract

In this paper, we construct stationary classical solutions of the shallow water equation with vanishing Froude number Fr in the so-called lake model. To this end we need to study solutions to the following semilinear elliptic problem \[cases -2div(∇ ub)=b(u-q1)+p,& in\; , u=0, &on\;∂ , cases \] for small >0, where p>1, div(∇ qb)=0 and ⊂R2 is a smooth bounded domain,. We showed that if q2b has m strictly local minimum(maximum) points zi,\,i=1,...,m, then there is a stationary classical solution approximating stationary m points vortex solution of shallow water equations with vorticity Σi=1m2π q( zi)b( zi). Moreover, strictly local minimum points of q2b on the boundary can also give vortex solutions for the shallow water equation. As a further study we construct vortex pair solutions as well. Existence and asymptotic behavior of single point non-vanishing vortex solutions were studied by S. De Valeriola and J. Van Schaftingen.