Decay properties of solutions to a 4-parameter family of wave equations

Abstract: In this paper, persistence properties of solutions are investigated for a 4-parameter family (k−abc equation) of evolution equations having (k+1)-degree nonlinearities and containing as its integrable members the Camassa-Holm, the Degasperis-Procesi, Novikov and Fokas-Olver-Rosenau-Qiao equations. These properties will imply that strong solutions of the k−abc equation will decay at infinity in the spatial variable provided that the initial data does. Furthermore, it is shown that the equation exhibits unique c… Show more

Persistent Decay of Solutions to the k-abc Equation in Weighted $$L^p$$Lp Spaces

Persistent Decay of Solutions to the k-abc Equation in Weighted $$L^p$$Lp Spaces

Non-uniqueness for the Fokas–Olver–Rosenau–Qiao equation

The Cauchy problem of a weakly dissipative shallow water equation