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Hamiltonian systems, Toda lattices, Solitons, Lax Pairs on weighted Z-graded graphs

Published 11 Aug 2020 in math-ph, hep-th, math.CA, math.MP, math.SP, and quant-ph | (2008.04897v2)

Abstract: We consider discrete one dimensional nonlinear equations and present the procedure of lifting them to Z-graded graphs. We identify conditions which allow one to lift one dimensional solutions to solutions on graphs. In particular, we prove the existence of solitons {for static potentials} on graded fractal graphs. We also show that even for a simple example of a topologically interesting graph the corresponding non-trivial Lax pairs and associated unitary transformations do not lift to a Lax pair on the Z-graded graph.

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