Nonlinear Sciences – Exactly Solvable and Integrable Systems
Scientific paper
2000-01-13
Nonlinear Sciences
Exactly Solvable and Integrable Systems
21 pages
Scientific paper
In the Painleve analysis of nonintegrable partial differential equations one obtains differential constraints describing the movable singularity manifold. We show, for a class of n-dimensional wave equations, that these constraints have a general structure which is related to the $n$-dimensional Bateman equation. In particular, we derive the exact expressions of the singularity manifold constraints for the n-dimensional sine-Gordon -, Liouville -, Mikhailov -, and double sine-Gordon equation, as well as two 2-dimensional polynomial field theory equations, and prove that their singularity manifold conditions are satisfied by the n-dimensional Bateman equation. Finally we give some examples.
Euler Norbert
Lindblom Ove
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