Seminar talk, 18 March 2026

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Speaker: Raffaele Vitolo

Title: Bi-Hamiltonian systems from homogeneous operators

Abstract:
Many "famous" integrable systems (KdV, AKNS, dispersive water waves etc.) have a bi-Hamiltonian pair of the following form: A1=P1+Rk and A2=P2, where P1, P2 are homogeneous first-order Hamiltonian operators and Rk is a homogeneous Hamiltonian operator of degree (order) k. The Hamiltonian property of P1, P2 and their compatibility were given an explicit analytic form and geometric interpretation long ago (Dubrovin, Novikov, Ferapontov, Mokhov). The Hamiltonian property of Rk was studied in the past (Doyle, Potemin; k=2,3) and recently revisited with interesting results.

In this talk, we illustrate the analytic form and some preliminary geometric interpretation of the compatibility conditions between Pi and Rk, k=2,3.

See the recent papers {arXiv

References:
{arXiv

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