Continuous spectrum or measurable reducibility for quasiperiodic cocycles in T d × SU(2)

Abstract

We continue our study of the local theory for quasiperiodic cocycles in T d × G, where G=SU(2), over a rotation satisfying a Diophantine condition and satisfying a closeness-to-constants condition, by proving a dichotomy between measurable reducibility (and therefore pure point spectrum), and purely continuous spectrum in the space orthogonal to L2(T d) L2(T d × G). Subsequently, we describe the equivalence classes of cocycles under smooth conjugacy, as a function of the parameters defining their K.A.M. normal form. Finally, we derive a complete classification of the dynamics of one-frequency (d=1) cocycles over a Recurrent Diophantine rotation. All theorems will be stated sharply in terms of the number of frequencies d, but in the proofs we will always assume d=1, for simplicity in expression and notation.