https://orcid.org/0000-0003-1098-6216
References
- Grayshan K, Himonas AA. Equations with peakon traveling wave solutions. Adv Dyn Syst Appl. 2013;8:217–232.
- Anco SC, da Silva PL, Freire IL. A family of wave-breaking equations generalizing the Camassa-Holm and Novikov equations. J Math Phys. 2015;56(9):Article ID 091506. 21.
- Novikov V. Generalizations of the Camassa-Holm equation. J Phys A. 2009;42(34):Article ID 342002.
- Efstathiou AG, Petropoulou EN. Peakons of Novikov equation via the homotopy analysis method. Symmetry. 2021;13(5):738.
- Himonas AA, Holliman C, Kenig C. Construction of 2-peakon solutions and ill-posedness for the Novikov equation. SIAM J Math Anal. 2018;50(3):2968–3006.
- Lundmark H, Shuaib B. Ghostpeakons and characteristic curves for the Camassa-Holm, Degasperis-Procesi and Novikov equations. SIGMA Symmetry Integrab Geom Methods Appl. 2019;15:017.
- Liu X, Liu Y, Qu C. Stability of peakons for the Novikov equation. J Math Pures Appl. 2014;101(2):172–187.
- 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(3):253–289.
- Mi Y, Mu C. On the Cauchy problem for the modified Novikov equation with peakon solutions. J Differ Equ. 2013;254(3):961–982.
- Zhou S, Chen R. A few remarks on the generalized Novikov equation. J Inequal Appl. 2013;2013(1):560.
- Himonas AA, Holliman C. Instability and nonuniqueness for the b-Novikov equation. J Nonlinear Sci. 2022;32(4), Paper 46 (29 pp). doi:10.1007/s00332-022-09798-6.
- da Silva PL, Freire IL. On the group analysis of a modified Novikov equation. In Cojocaru MG, Kotsireas IS, Makarov RN, et al. editors, Interdisciplinary topics in applied mathematics, modeling and computational science, Springer Proceedings in Mathematics & Statistics, Vol. 117. 2015. p. 161–166.
- Holm DD, Staley MF. Wave structure and nonlinear balances in a family of evolutionary PDEs. SIAM J Appl Dyn Syst. 2003;2(3):323–380.
- Holm DD, Staley MF. Nonlinear balance and exchange of stability in dynamics of solitons, peakons, rambs/cliffs and leftons in a 1−−1 nonlinear evolutionary PDE. Phys Lett A. 2003;308(5–6):437–444.
- Artebrand R, Schroll HJ. Numerical simulation of Camassa–Holm peakons by adaptive upwinding. Appl Numer Math. 2006;56(5):695–711.
- Kalisch H, Lenells J. Numerical study of traveling-wave solutions for the Camassa–Holm equation. Chaos Solitons Fract. 2005;25(2):287–298.
- Xu Y, Shu C-W. Local discontinuous Galerkin method for the Camassa–Holm equation. SIAM J Numer Anal. 2006;46(4):1998–2021.
- Liao SJ. Beyond perturbation: introduction to the homotopy analysis method. Boca Raton: Chapman & Hall/CRC, CRC Press LLC; 2004.
- Liao SJ. Homotopy analysis method in nonlinear differential equations. Heidelberg: Springer & Higher Education Press; 2012.
- Abbasbandy S, Parkes EJ. Solitary-wave solutions of the Degasperis–Procesi equation by means of the homotopy analysis method. Int J Comput Math. 2010;87(10):2303–2313.
- Wu W, Liao SJ. Solving solitary waves with discontinuity by means of the homotopy analysis method. Chaos Solitons Fract. 2005;26(1):177–185.
- Liao SJ. Chance and challenge: a brief review of homotopy analysis method. In Liao S, editor. Advances in the homotopy analysis method. Hackensack, NJ: World Sci. Publ.; 2014.