Special Session 89: DYNAMICS AND SPECTRA OF QUASIPERIODIC SCHRODINGER OPERATORS

Reducibility of quasi-periodic symplectic cocycles
Yi Pan
Institute of Science and Technology Austria
Austria
Co-Author(s):    Artur Avila, Raphael Krikorian
Abstract:
Reducibility of quasi-periodic cocyles valued in symplectic groups is related to the spectrum of discrete Schrodinger operators on strips. We will talk about a global reducibility result: given one parameter family of such cocycles, for almost every parameter, either the maximal Lyapunov exponent is positive, or the cocycle is almost conjugate to some precise model. The techniques include Kotani theory, KAM theory and in particular study of hyperbolicity of renormalization operator. This is a joint work with Artur Avila and Raphael Krikorian.