On uniqueness results for the Benjamin equation

Abstract

We prove that the uniqueness results obtained in urrea for the Benjamin equation, cannot be extended for any pair of non-vanishing solutions. On the other hand, we study uniqueness results of solutions of the Benjamin equation. With this purpose, we showed that for any solutions u and v defined in × [0,T], if there exists an open set I⊂ such that u(·,0) and v(·,0) agree in I, t u(·,0) and t v(·,0) agree in I, then u v. To finish, a better version of this uniqueness result is also established.