Let LA be a hyperbolic toral automorphism on the torus T . Then, a point u ∈ T is called nonwandering if for every open neighborhood G of u there exists a positive integer n such that φ  Prove that...

Let LA be a hyperbolic toral automorphism on the torus T . Then, a point u ∈ T is called nonwandering if for every open neighborhood G of u there exists a positive integer n such that
φ Prove that every point in T is nonwandering.φ