Rogue peakon, well-posedness, ill-posedness and blow-up phenomenon for an integrable Camassa-Holm type equation

Abstract

In this paper, we study an integrable Camassa-Holm (CH) type equation with quadratic nonlinearity. The CH type equation is shown integrable through a Lax pair, and particularly the equation is found to possess a new kind of peaked soliton (peakon) solution - called rogue peakon, that is given in a rational form with some logarithmic function, but not a regular traveling wave. We also provide multi-rogue peakon solutions. Furthermore, we discuss the local well-posedness of the solution in the Besov space Bp,rs with 1≤ p,r≤∞, s> \1+1/p,3/2\ or B2,13/2, and then prove the ill-posedness of the solution in B2,∞3/2. Moreover, we establish the global existence and blow-up phenomenon of the solution, which is, if m0(x)=u0-u0xx≥() 0, then the corresponding solution exists globally, meanwhile, if m0(x)≤() 0, then the corresponding solution blows up in a finite time.