Locally divergent orbits of maximal tori and values of forms at integral points

Abstract

Let be a semisimple algebraic group defined over a number field K, a maximal K-split torus of , S a finite set of valuations of K containing the archimedean ones, the ring of S-integers of K and KS the direct product of the completions Kv, v ∈ S. Denote G = (KS), T = (KS) and = (). Let Tπ(g) be a locally divergent orbit for the action of T on G/ by left translations. We prove: (1) if \# S = 2 then the closure Tπ(g) is a union of finitely many T-orbits all stratified in terms of parabolic subgroups of × and, therefore, Tπ(g) is homogeneous only if Tπ(g) is closed, (2) if \# S > 2 and K is not a CM-field then Tπ(g) is squeezed between closed orbits of two reductive groups of equal semisimple ranks implying that Tπ(g) is homogeneous when = SLn. As an application, if f = (fv)v ∈ S ∈ KS[x1, ·s, xn], where fv are non-pairwise proportional decomposable over K homogeneous forms, then f(n) is dense in KS.