On the uniqueness of multi-breathers of the modified Korteweg-de Vries equation

Abstract: We consider the modified Korteweg-de Vries equation (mKdV) and prove that given any sum of solitons and breathers of (mKdV) (with distinct velocities), there exists a solution of (mKdV) such that ( ) − ( ) → 0 when → +∞, which we call multi-breather. In order to do this, we work at the 2 level (even if usually solitons are considered at the 1 level). We will show that this convergence takes place in any space and that this convergence is exponentially fast in time. We also show that the constructed multi-breat… Show more