Construction of 2-peakon Solutions and Ill-Posedness for the Novikov equation

Abstract

For the Novikov equation, on both the line and the circle, we construct a 2-peakon solution with an asymmetric antipeakon-peakon initial profile whose Hs-norm for s<3/2 is arbitrarily small. Immediately after the initial time, both the antipeakon and peakon move in the positive direction, and a collision occurs in arbitrarily small time. Moreover, at the collision time the Hs-norm of the solution becomes arbitrarily large when 5/4<s<3/2, thus resulting in norm inflation and ill-posedness. However, when s<5/4, the solution at the collision time coincides with a second solitary antipeakon solution. This scenario thus results in nonuniqueness and ill-posedness. Finally, when s=5/4 ill-posedness follows either from a failure of convergence or a failure of uniqueness. Considering that the Novikov equation is well-posed for s>3/2, these results put together establish 3/2 as the critical index of well-posedness for this equation. The case s=3/2 remains an open question.