-Novikov equation
http://orcid.org/0000-0003-4625-2425
References
- Novikov V . Generalizations of the Camassa-Holm equation. J Phys A Math Theor. 2009;42:342002.
- Camassa R , Holm DD . An integrable shallow water equation with peaked solitons. Phys Rev Lett. 1993;71(11):1661–1664.
- Fuchssteiner B , Fokas AS . Symplectic structures, their Bäcklund transformations and hereditary symmetries. Phys D. 1981;4:47–66.
- Degasperis A , Procesi M . Asymptotic integrability. In: Degasperis A , Gaeta G , editors. Symmetry and pertubation theory. Singapore: World scientific; 1999. p. 23–37.
- Hone ANW , Wang JP . Integrable peakon equations with cubic nonlinearity. J Phys A Math Theor. 2008;41:372002.
- Hone ANW , Lundmark H , Szmigielski J . Explicit multipeakon solutions of Novikov’s cubically nonlinear integrable Camassa-Holm type equation. Dyn Partial Differ Equ. 2009;6:253–289.
- Tiglay F . The periodic Cauchy problem for Novikov’s equation. Int Math Res Not. 2011;2010:4633–4648.
- Wu X , Yin Z . Global weak solutions for the Novikov equation. J Phys A Math Theor. 2011;44:055202.
- Liu X , Liu Y , Qu C . Stability of peakons for the Novikov equation. J Math Pures Appl. 2014;101:172–187.
- Constantin A . The trajectories of particles in Stokes waves. Invent Math. 2006;166:523–535.
- Constantin A , Escher J . Particle trajectories in solitary water waves. Bull Amer Math Soc. 2007;44:423–431.
- Constantin A , Escher J . Analyticity of periodic traveling free surface water waves with vorticity. Ann Math. 2011;173(1):559–568.
- Constantin A , Strauss W . Stability of peakons. Commun Pure Appl Math. 2000;53:603–610.
- Lenells J . Stability of periodic peakons. Int Math Res Not. 2004;10:485–499.
- Lenells J . A variational approach to the stability of periodic peakons. J Nonlinear Math Phys. 2004;11:151–163.
- Constantin A , Lannes D . The hydrodynamical relevance of the Camassa--Holm and Degasperis--Procesi equations. Arch Ration Mech Anal. 2009;192:165–186.
- Johnson RS . Camassa-Holm. Korteweg-de Vries and related models for water waves, J Fluid Mech. 2002;455:63–82.
- Kruse D . Variational derivation of the Camassa-Holm shallow water equation. J Nonlinear Math Phys. 2007;14(3):303–312.
- Camassa R , Holm DD , Hyman J . A new integrable shallow water equation. Adv Appl Mech. 1994;31:1–33.
- Constantin A . On the scattering problem for the Camassa-Holm equation. Proc R Soc Lond Ser A. 2001;457:953–970.
- Constantin A , Gerdjikov VS , Ivanov I . Inverse scattering transform for the Camassa-Holm equation. Inverse Prob. 2006;22:2197–2207.
- Constantin A , McKean HP . A shallow water equation on the circle. Commun Pure Appl Math. 1999;52(8):949–982.
- Alber MS , Camassa R , Holm DD , et al . The geometry of peaked solitons and billiard solutions of a class of integrable PDE’s. Lett Math Phys. 1994;32:137–151.
- Cao C , Holm D , Titi E . Traveling wave solutions for a class of one-dimensional nonlinear shallow water wave models. J Dyn. Differ Equ. 2004;16:167–178.
- Chou KS , Qu CZ . Integrable equations arising from motions of plane curves I. Phys D. 2002;162:9–33.
- Constantin A , Kappeler T , Kolev B , et al . On geodesic exponential maps of the Virasoro group. Ann Global Anal Geom. 2007;31:155–180.
- Kolev B . Lie groups and mechanics: an introduction. J Nonlinear Math Phys. 2004;11(4):480–498.
- Kouranbaeva S . The Camassa-Holm equation as a geodesic flow on the diffeomorphism group. J Math Phys. 1999;40:857–868.
- Misiolek G . A shallow water equation as a geodesic flow on the Bott-Virasoro group and the KdV equation. Proc Amer Math Soc. 1998;125:203–208.
- Constantin A . Existence of permanent and breaking waves for a shallow water equation: a geometric approach. Ann Inst Fourier (Grenoble). 2000;50:321–362.
- Constantin A , Escher J . Wave breaking for nonlinear nonlocal shallow water equations. Acta Math. 1998;181:229–243.
- Constantin A , Escher J . On the blow-up rate and the blow-up set of breaking waves for a shallow water equation. Math Z. 2000;233:75–91.
- Constantin A , Escher J . Global existence and blow-up for a shallow water equation. Ann Scuola Norm Sup Pisa. 1998;26:303–328.
- Li YA , Olver PJ . Well-posedness and blow-up solutions for an integrable nonlinearly dispersive model wave equation. J Differ Equ. 2000;162:27–63.
- Hunter JK , Saxton R . Dynamics of director fields. SIAM J Appl Math. 1991;51:1498–1521.
- Khesin B , Lenells J , Misiolek G . Generalized Hunter-Saxton equation and the geometry of the group of circle diffeomorphisms. Math Ann. 2008;342:617–656.
- Fu Y , Liu Y , Qu CZ . On the blow-up structure for the generalized periodic Camassa-Holm and Degasperis-Procesi equations. J Funct Anal. 2012;262:3125–3158.
- Constantin A , Ivanov RI , Lenells J . Inverse scattering transform for the Degasperis-Procesi equation. Nonlinearity. 2010;23(10):2559–2575.
- Degasperis A , Holm DD , Hone ANW . A new integral equation with peakon solutions. Theoret Math Phys. 2002;133:1463–1474.
- Escher J , Liu Y , Yin Z . Shock waves and blow-up phenomena for the periodic Degasperis-Procesi equation Indiana Univ Math J. 2007;56:87–117.
- Liu Y , Yin Z . Global existence and blow-up phenomena for the Degasperis-Procesi equation. Commun Math Phys. 2006;267:801–820.
- Lenells J , Misiolek G , Tiglay F . Integrable evolution equations on spaces of tensor densities and their peakon solutions. Commun Math Phys. 2010;299:129–161.
- Olver PJ , Rosenau P . Tri-Hamiltonian duality between solitons and solitary-wave solutions having compact support. Phys Rev E. 1996;53:1900–1906.
- Fokas A . On a class of physically important integrable equations. Phys D. 1995;8:145–150.
- Fuchssteiner B . Some tricks from the symmetry-toolbox for nonlinear equations: generalizations of the Camassa-Holm equation. Phys D. 1996;95:229–243.
- Gui G , Liu Y , Olver PJ , et al . Wave-breaking and peakons for a modified Camassa-Holm equation. Commun Math Phys. 2013;319:731–759.
- Himonas A , Holliman C . The Cauchy problem for the Novikov equation. Nonlinearity. 2012;25:449–479.
- Qu CZ , Fu Y , Liu Y . Well-posedness, wave breaking and peakons for a modified μ-Camassa-Holm equation. J Funct Anal. 2014;266:422–477.
- Liu Y , Qu CZ , Zhang Y . Stability of peakons for the modified μ-Camassa--Holm equation. Phys D. 2013;66–74.
- Constantin A . Edge waves along a sloping beach. J Phys A. 2001;34:9723–9731.
- Constantin A . An exact solution for equatorially trapped waves. J Geophys Res. 2012;117:C05029.
- Constantin A . Some nonlinear, equatorially trapped, nonhydrostatic internal geophysical waves. J Phys Oceanogr. 2014;44:781–789.
- Henry D . On Gerstner’s water wave. J Nonlinear Math Phys. 2008;15(suppl. 2):87–95.
- Henry D . Equatorially trapped nonlinear water waves in a β-plane approximation with centripetal forces. J Fluid Mech. 2016;804(R1):11.
- Li YA , Olver PJ , Rosenau P . Non-analytic solutions of nonlinear wave models. In: Grosser M , Höormann G , Kunzinger M , et al. , editors. Nonlinear theory of generalized functions, in: Research notes in mathematics. Vol. 401. New York (NY): Chapman and Hall/CRC; 1999. p. 129–145.