On a class of spaces of skew-symmetric forms related to Hamiltonian systems of conservation laws

Abstract

It was shown in FPV that the classification of n-component systems of conservation laws possessing a third-order Hamiltonian structure reduces to the following algebraic problem: classify n-planes H in 2(Vn+2) such that the induced map Sym2H 4Vn+2 has 1-dimensional kernel generated by a non-degenerate quadratic form on H*. This problem is trivial for n=2, 3 and apparently wild for n≥ 5. In this paper we address the most interesting borderline case n=4. We prove that the variety V parametrizing those 4-planes H is an irreducible 38-dimensional PGL(V6)-invariant subvariety of the Grassmannian G(4, 2V6). With every H∈V we associate a characteristic cubic surface SH⊂ P H, the locus of rank 4 two-forms in H. We demonstrate that the induced characteristic map σ: V / PGL(V6) Mc, where Mc denotes the moduli space of cubic surfaces in P3, is dominant, hence generically finite. A complete classification of 4-planes H∈V with the reducible characteristic surface SH is given.