Bi-Hamiltonian structures of KdV type, cyclic Frobenius algebrae and Monge metrics

Abstract: We study algebraic and projective geometric properties of Hamiltonian trios determined by a constant coefficient second-order operator and two first-order localizable operators of Ferapontov type. We show that first-order operators are determined by Monge metrics, and define a structure of cyclic Frobenius algebra. Examples include the AKNS system, a $2$-component generalization of Camassa-Holm equation and the Kaup--Broer system. In dimension $2$ the trio is completely determined by two conics of rank at least $2$. We provide a partial classification in dimension $4$.