References
- Constantin A, Lannes D. The hydrodynamical relevance of the Camassa-Holm and Degasperis-Procesi equations. Arch Ration Mech Anal. 2009;192(1):165–186.
- Whitham GB. Linear and Nonlinear Waves. Wiley: New York; 2011.
- Stoker JJ. Water waves. New York: Interscience Publ; 1957.
- Korteweg DJ, de Vries G. On the change of form of long waves advancing in a rectangular canal, and on a new type of long stationary waves. Philos Mag. 1895;39(240):422–443.
- Benjamin T, Bona J, Mahony J. Model equations for long waves in nonlinear dispersive systems. Philos Trans R Soc Lond Ser A Math Phys Eng Sci. 1972;227:47–48.
- Camassa R, Holm DD. An integrable shallow water equation with peaked solitons. Phys Rev Lett. 1993;71(11):1661–1664.
- Fokas AS, Fuchssteiner B. Symplectic structures, their B a¨klund transformations and hereditary symmetries. Phys D. 1981;4(1):47–66.
- Boutet de Monvel A, Kostenko A, Shepelsky D, et al. Long-time asymptotics for the Camassa-Holm equation. SIAM J Math Anal. 2009;41(4):1559–1588.
- Constantin A. On the inverse spectral problem for the Camassa-Holm equation. J Funct Anal. 1998;155(2):352–363.
- Constantin A. On the scattering problem for the Camassa-Holm equation. Proc R Soc Lond A. 2001;457(2008):953–970.
- Constantin A, McKean HP. A shallow water equation on the circle. Comm Pure Appl Math. 1999;52:949–982.
- Constantin A, Gerdjikov VS, Ivanov RI. Inverse scattering transform for the Camassa-Holm equation. Inverse Probl. 2006;22(6):2197–2207.
- Eckhardt J. The inverse spectral transform for the conservative Camassa-Holm flow with decaying initial data. Arch Ration Mech Anal. 2017;224(1):21–52.
- Camassa R, Holm DD, Hyman J. A new integrable shallow water equation. Adv Appl Mech. 1994;31:1–33.
- Constantin A, Escher J. Wave breaking for nonlinear nonlocal shallow water equations. Acta Math. 1998;181(2):229–243.
- Constantin A. The trajectories of particles in stokes waves. Invent Math. 2006;166(3):523–535.
- Constantin A. Particle trajectories in extreme stokes waves. IMA J Appl Math. 2012;77(3):293–307.
- Constantin A, Strauss WA. Stability of peakons. Comm Pure Appl Math. 2000;53:603–610.
- Constantin A, Strauss WA. Stability of the Camassa-Holm solitons. J Nonlinear Sci. 2002;12(4):415–422.
- Johnson RS. Camassa-Holm Korteweg-de Vries and related models for water waves. J Fluid Mech. 2002;455:63–82.
- Duruk Mutlubaş N. On the Cauchy problem for a model equation for a shallow water waves of moderate amplitude. Nonlinear Anal Real World Appl. 2013;14(5):2022–2026.
- Mi Y, Mu C. On the solutions of a model equation for a shallow water waves of moderate amplitude. J Differ Equ. 2013;255(8):2101–2129.
- Zhou S. The local well-posedness, existence and uniqueness of weak solutions for a model equation for shallow water waves of moderate amplitude. J Differ Equ. 2015;258:1–26.
- Zhou S, Wang B, Chen R. Non-uniform dependence on initial data for the periodic Constantin-Lannes equation. J Math Phys. 2018;59(3): Article ID 031502.
- Zhou S, Qiao Z, Mu C, et al. Continuity and asymptotic behaviors for a shallow water wave model with moderate amplitude. J Differ Equ. 2017;263(2):910–933.
- Constantin A. Nonlinear water waves with applications to wave-current interactions and tsunamis, CBMS-NSF Regional Conference Ser. in Appl. Math. vol. 81, Philadelphia (PA): SIAM; 2011.
- Constantin A, Escher J. Particle trajectories in solitary water waves. Bull Amer Math Soc (N.S). 2007;44(3):423–431.
- Constantin A, Escher J, Hsu HC. Pressure beneath a solitary water wave: mathematical theory and experiments. Arch Ration Mech Anal. 2011;201(1):251–269.
- Geyer A. Solitary traveling water waves of moderate amplitude. J Nonlinear Math Phys. 2012;19(Supplement 1):104.
- Duruk Mutlubaş N, Geyer A. Orbital stability of solitary waves of moderate amplitude in shallow water. J Differ Equ. 2013;255(2):254–263.
- Bressan A, Constantin A. Global conservative solutions of the Camassa-Holm equation. Arch Rational Mech Anal. 2007;183(2):215–239.
- Bressan A, Constantin A. Global dissipative solutions of the Camassa-Holm equation. Anal Appl (Singap). 2007;5(1):1–27.
- Bressan A, Chen G, Zhang Q. Uniqueness of conservative solutions to the Camassa-Holm equation via characteristics. Discrete Contin Dyn Syst. 2015;35(1):25–42.
- Dafermos C. Generalized characteristics and the Hunter-Saxton equation. J Hyperbolic Differ Equ. 2011;8(1):159–168.
- Jamróz G. On uniqueness of dissipative solutions of the Camassa-Holm equation, arXiv:1611.00333.
- Li M, Zhang Q. Generic regularity of conservative solutions to Camassa-Holm type equations. SIAM J Math Anal. 2017;49(4):2920–2949.
- Bloom JM. The local structure of smooth maps of manifolds [B. A. Thesis]. Cambridge, MA: Harvard University; 2004.
- Bressan A, Chen G. Generic regularity of conservative solutions to a nonlinear wave equation. Ann Inst Henri Poincare (C) Anal Nonlinear Anal. 2017;34(2):335–354.
- Golubitsky M, Guillemin V. Stable mappings and their singularities. New York: Springer-Verlag; 1973.
- Tu X, Mu C, Qiu S. Continuous dependence on data under the Lipschitz metric for the rotation-Camassa-Holm equation. Acta Math Sci. 2021;41(1):1–18.
- Tu X, Liu Y, Mu C. Existence and uniqueness of the global conservative weak solutions to the rotation-Camassa-Holm equation. J Differ Equ. 2019;266(8):4864–4900.
- Zhou S, Mu C. Global conservative solutions for a model equation for shallow water waves of moderate amplitude. J Differ Equ. 2014;256(5):1793–1816.