Bibliographic Details
| Title: |
On some new forms of lattice integrable equations |
| Authors: |
Babalic, Nicoleta-Corina, Carstea, A. S. |
| Source: |
Cent. Eur. J. Phys. 12(5), 2014, 341-347 |
| Publication Year: |
2015 |
| Collection: |
Nonlinear Sciences |
| Subject Terms: |
Nonlinear Sciences - Exactly Solvable and Integrable Systems |
| More Details: |
Inspired by the forms of delay-Painleve equations, we consider some new differential-discrete systems of KdV, mKdV and Sine-Gordon - type related by simple one way Miura transformations to classical ones. Using Hirota bilinear formalism we construct their new integrable discretizations, some of them having higher order. In particular, by this procedure, we show that the integrable discretization of intermediate sine-Gordon equation is exactly lattice mKdV and also we find a bilinear form of the recently proposed lattice Tzitzeica equation. Also the travelling wave reduction of these new lattice equations is studied and it is shown that all of them, including the higher order ones, can be integrated to Quispel-Roberts-Thomson (QRT) mappings.
Comment: 15 pages |
| Document Type: |
Working Paper |
| Access URL: |
http://arxiv.org/abs/1508.04998 |
| Accession Number: |
edsarx.1508.04998 |
| Database: |
arXiv |
