Abstract:
Schrödinger operators with quasi-periodic potentials were intensively
studied in the last few decades. Their spectral properties
depend on the value of the coefficient in front of the
potential, so called. coupling constant. For small values of
the coupling constant the spectrum is absolutely continuous,
while for large coupling constants the spectrum is pure point.
Natural families of Schrödinger operators with quasi-periodic
potentials appear in the context of the Aubry-Mather theory.
In this setting there are no coipling constants. Instead
operators depend on the nonlinearity parameter for related
area-preserving maps. We shall discuss the transition from
the absolutely continuous to the pure point spectrum for such
families of Schrödinger operators.