 - Breather, Lumps, and Soliton Molecules for the - Dimensional Elliptic Toda EquationYuechen Jia, Yu Lu, Miao Yu and Hasi Gegen Advances in Mathematical Physics, 2021, vol. 2021, 1-18 Abstract: The - dimensional elliptic Toda equation is a higher dimensional generalization of the Toda lattice and also a discrete version of the Kadomtsev-Petviashvili-1 (KP1) equation. In this paper, we derive the - breather solution in the determinant form for the - dimensional elliptic Toda equation via Bäcklund transformation and nonlinear superposition formulae. The lump solutions of the - dimensional elliptic Toda equation are derived from the breather solutions through the degeneration process. Hybrid solutions composed of two line solitons and one breather/lump are constructed. By introducing the velocity resonance to the - soliton solution, it is found that the - dimensional elliptic Toda equation possesses line soliton molecules, breather-soliton molecules, and breather molecules. Based on the - soliton solution, we also demonstrate the interactions between a soliton/breather-soliton molecule and a lump and the interaction between a soliton molecule and a breather. It is interesting to find that the KP1 equation does not possess a line soliton molecule, but its discrete version—the - dimensional elliptic Toda equation—exhibits line soliton molecules. Date: 2021 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jnlamp:5211451 DOI: 10.1155/2021/5211451 Access Statistics for this article More articles in Advances in Mathematical Physics from Hindawi |
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