Khintchine's Theorem for Symmetric matrices via Flows on the Space of Symplectic Lattices

Abstract

We establish Diophantine approximation results for real symmetric matrices by collections of linearly independent integer vectors. For X ∈ Symd(R), we prove a Dirichlet-type theorem guaranteeing the existence of integral Lagrangian frames (Q, P) ∈ Matd × 2d(Z) that satisfy QX + P op ≤ cd/N and Q op ≤ N for any N ≥ 1. Furthermore, we establish a Khintchine-type zero-one law, demonstrating that the size of the set of ψ-approximable symmetric matrices is determined by the convergence or divergence of the series Σq ≥ 1 qς- 1ψ(q)ς, where ς= d(d+1)/2. The proofs rely on the reduction theory of the Siegel upper half-space, dynamical formulation over the space of symplectic lattices, and an analysis of the Siegel transform adapted to count Lagrangian frames instead of single lattice points.