Title | DIFFERENTIAL INVARIANTS FOR HYPERBOLIC SYSTEMS |
Publication Type | Journal Article |
Year of Publication | 2011 |
Authors | YILMAZ, HALIS |
Secondary Title | Communications in Applied Analysis |
Volume | 15 |
Issue | 3 |
Start Page | 363 |
Pagination | 372 |
Date Published | 08/2011 |
Type of Work | scientific: mathematics |
ISSN | 1083–2564 |
AMS | 37K35. |
Abstract | We show that Z3 × R4 Toda Lattice Equations can be obtained from the Laplace-Darboux transformations of invariants for a four-dimensional hyperbolic system. We also present the relationship between the invariants of L and the invariants of M when [L, M] = 0, where L and M are n × n operator matrices. |
URL | http://www.acadsol.eu/en/articles/15/3/8.pdf |
Short Title | DIFFERENTIAL INVARIANTS FOR HYPERBOLIC SYSTEMS |
Refereed Designation | Refereed |
Full Text | REFERENCES[1] Athorne, C., A Z2 × R3 Toda system, Phys. Lett. A, 206 (1995) 162–166.
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