The moment map on the space of symplectic 3D Monge-Amp\`ere equations

Abstract

For any second-order scalar PDE E in one unknown function, that we interpret as a hypersurface of a second-order jet space J2, we construct, by means of the characteristics of E, a sub-bundle of the contact distribution of the underlying contact manifold J1, consisting of conic varieties. We call it the contact cone structure associated with E. We then focus on symplectic Monge-Amp\`ere equations in 3 independent variables, that are naturally parametrized by a 13-dimensional real projective space. If we pass to the field of complex numbers C, this projective space turns out to be the projectivization of the 14-dimensional irreducible representation of the simple Lie group Sp(6,C): the associated moment map allows to define a rational map from the space of symplectic 3D Monge-Amp\`ere equations to the projectivization of the space of quadratic forms on a 6-dimensional symplectic vector space. We study in details the relationship between the zero locus of the image of , herewith called the cocharacteristic variety, and the contact cone structure of a 3D Monge-Amp\`ere equation E: under the hypothesis of non-degenerate symbol, we prove that these two constructions coincide. A key tool in achieving such a result will be a complete list of mutually non-equivalent quadratic forms on a 6-dimensional symplectic space, which has an interest on its own.