On a Lagrangian formulation of the 1D Green-Naghdi system
Abstract
In this paper we consider the 1D Green-Naghdi system. This system describes the evolution of water waves over a flat bottom in the shallow water regime in terms of the surface height h and the horizontal velocity u. We give a Lagrangian formulation of the 1D Green-Naghdi system on a Sobolev type diffeomorphism group. As an application of this formulation we prove local well-posedness for (h,u) in the Sobolev space (1+Hs()) × Hs+1(),\; s > 1/2. This improves the local well-posedness range for the 1D Green-Naghdi system.
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