A bi-Hamiltonian nature of the Gaudin algebras

Abstract

Let q be a Lie algebra over a field K and p, p∈ K[t] two different normalised polynomials of degree at least 2. As vector spaces both quotient Lie algebras q[t]/(p) and q[t]/( p) can be identified with W= q·1 q t… q tn-1. If deg\,(p- p) is at most 1, then the Lie brackets [\,\,,\,]p, [\,\,,\,] p induced on W by p and p, respectively, are compatible. By a general method, known as the Lenard-Magri scheme, we construct a subalgebra Z=Z(p, p)⊂ S(W) q·1 such that \Z,Z\p=\Z,Z\ p=0. If tr.deg\, S( q) q=ind\, q and q has the codim-2 property, then tr.deg\, Z takes the maximal possible value, which is ((n-1) q)/2+((n+1)ind\, q)/2. If q= g is semisimple, then Z contains the Hamiltonians of a suitably chosen Gaudin model. Therefore, in a non-reductive case, we obtain a completely integrable generalisation of Gaudin models.