Special Vinberg cones, invariant admissible cubics and special real manifolds

Abstract

By Vinberg theory any homogeneous convex cone V may be realized as the cone of positive Hermitian matrices in a T-algebra of generalised matrices. The level hypersurfaces Vq ⊂ V of homogeneous cubic polynomials q with positive definite Hessian (symmetric) form gq := - Hess((q))|T Vq are the special real manifolds. Such manifolds occur as scalar manifolds of the vector multiplets in N=2, D=5 supergravity and, through the r-map, correspond to K\"ahler scalar manifolds in N = 2 D = 4 supergravity. We offer a simplified exposition of the Vinberg theory in terms of Nil-algebras (= the subalgebras of upper triangular matrices in Vinberg T-algebras) and we use it to describe all rational functions on a special Vinberg cone that are G0- or G'- invariant, where G0 is the unimodular subgroup of the solvable group G acting simply transitively on the cone, and G' is the unipotent radical of G0. The results are used to determine G0- and G'-invariant cubic polynomials q that are admissible (i.e. such that the hypersurface Vq=\ q=1\ V has positive definite Hessian form gq) for rank 2 and rank 3 special Vinberg cones. We get in this way examples of continuous families of non-homogeneous special real manifolds of cohomogeneity less than or equal to two.