Asymptotic analysis of a Neumann problem in a domain with cusp. Application to the collision problem of rigid bodies in a perfect fluid

Abstract

We study a two dimensional collision problem for a rigid solid immersed in a cavity filled with a perfect fluid. We are led to investigate the asymptotic behavior of the Dirichlet energy associated to the solution of a Laplace Neumann problem as the distance >0 between the solid and the cavity's bottom tends to zero. Denoting by α>0 the tangency exponent at the contact point, we prove that the solid always reaches the cavity in finite time, but with a non zero velocity for α <2 (real shock case), and with null velocity for α ≥slant 2 (smooth landing case). Our proof is based on a suitable change of variables sending to infinity the cusp singularity at the contact. More precisely, for every ≥slant 0, we transform the Laplace Neumann problem into a generalized Neumann problem set on a domain containing a horizontal strip ]0,[× ]0,1[, where +∞.