The Oriented Associativity equation plays a fundamental role in the theory of Integrable Systems. In this paper we prove that the equa- tion, besides being Hamiltonian with respect to a first-order Hamilto- nian operator, has a third-order non-local homogeneous Hamiltonian operator belonging to a class which has been recently studied, thus providing a highly non-trivial example in that class and showing in- triguing connections with algebraic geometry.

Bi-Hamiltonian structure of the Oriented Associativity equation

Vitolo, Raffaele
2019-01-01

Abstract

The Oriented Associativity equation plays a fundamental role in the theory of Integrable Systems. In this paper we prove that the equa- tion, besides being Hamiltonian with respect to a first-order Hamilto- nian operator, has a third-order non-local homogeneous Hamiltonian operator belonging to a class which has been recently studied, thus providing a highly non-trivial example in that class and showing in- triguing connections with algebraic geometry.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11587/438793
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