Multisolitons are the unique constrained minimizers of the KdV conserved quantities

Abstract

We consider the following variational problem: minimize the (n+1)st polynomial conserved quantity of KdV over Hn(R) with the first n conserved quantities constrained. Maddocks and Sachs used that n-solitons are local minimizers for this problem in order to prove that n-solitons are orbitally stable in Hn(R). Given n constraints that are attainable by an n-soliton, we show that there is a unique set of n amplitude parameters so that the corresponding multisolitons satisfy the constraints. Moreover, we prove that these multisolitons are the unique global constrained minimizers. We then use this variational characterization to provide a new proof of the orbital stability result of Maddocks and Sachs via concentration compactness. In the case when the constraints can be attained by functions in Hn(R) but not by an n-soliton, we discover new behavior for minimizing sequences.