Towards the classification of homogeneous third-order Hamiltonian operators
Abstract
Let V be a vector space of dimension n+1. We demonstrate that n-component third-order Hamiltonian operators of differential-geometric type are parametrised by the algebraic variety of elements of rank n in S2(2V) that lie in the kernel of the natural map S2(2V) 4V. Non-equivalent operators correspond to different orbits of the natural action of SL(n+1). Based on this result, we obtain a classification of such operators for n≤ 4.
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