Peakon Solutions of Alice-Bob b-Family Equation and Novikov Equation

Abstract: By requiring B=P^sT^dA and substituting u=A+B into the b-family equation and Novikov equation, we can obtain Alice-Bob peakon systems, where P^s and T^d are the arbitrary shifted parity transformation and delayed time reversal transformation, respectively. The nonlocal integrable Camassa-Holm equation and Degasperis-Procesi equation can be derived from the Alice-Bob b-family equations by choosing different parameters. Some new types of interesting solutions are solved including explicit one-peakons, two-peakon… Show more

“…As we all know, exact solutions for some local or nonlocal nonlinear evolution equations (NLEEs) have been applied in the nonlinear science fields. Solitons and rational solutions of many NLEEs have been investigated by researches [12][13][14][15][16]. Among these rational solutions, lump solutions, breather wave solutions, and rogue wave solutions are hot point all the time.…”

“…(Color online) interaction of a soliton molecule and a breather wave for the (2 + 1)-dimensional variable-coefficient CDGKS equation with parameter(13).…”

Soliton Molecules and Some Novel Types of Hybrid Solutions to (2 + 1)-Dimensional Variable-Coefficient Caudrey-Dodd-Gibbon-Kotera-Sawada Equation

“…As we all know, exact solutions for some local or nonlocal nonlinear evolution equations (NLEEs) have been applied in the nonlinear science fields. Solitons and rational solutions of many NLEEs have been investigated by researches [12][13][14][15][16]. Among these rational solutions, lump solutions, breather wave solutions, and rogue wave solutions are hot point all the time.…”

“…(Color online) interaction of a soliton molecule and a breather wave for the (2 + 1)-dimensional variable-coefficient CDGKS equation with parameter(13).…”

Soliton Molecules and Some Novel Types of Hybrid Solutions to (2 + 1)-Dimensional Variable-Coefficient Caudrey-Dodd-Gibbon-Kotera-Sawada Equation

“…Recent studies show that reverse space and reverse time nonlocal nonlinear integrable equations can be introduced from the remarkably simple symmetry reductions of general AKNS scattering problems [8]. Many nonlinear systems, such as KdV equation [9], mKdV equation, NLS equation and Sine-Gordon equation, b-family equation, and Novikov equation [10], can be extended to shifted-parity and delayed time reversal AB systems.…”

Symmetry Analysis, Bäcklund Transformations, and Interaction Solutions for an AB Modified KdV System

Lie symmetry analysis, conservation laws and solitary wave solutions to a fourth-order nonlinear generalized Boussinesq water wave equation