Global density of reducible quasi-periodic cocycles on T¹ x SU(2)

We prove that given α in a set of total (Haar) measure in T¹ = R/Z, the set of A ∈ C∞(T¹, SU(2)) for which the skew-product system (α, A) : T¹ x SU(2) → T¹ x SU(2), (α, A)(θ, y) = (θ + α, A(θ)y) is reducible - that is, A(·) = B(· + α)A₀B(·)^-1, for some A₀ ∈ SU(2), B ∈ C∞(T¹, SU(2)),-is dense for the C∞-topology.