J. Buzzi, O. Sester, M. Tsujii Weakly expanding skew-products of quadratic maps (44K, LateX 2e) ABSTRACT. We consider quadratic skew-products over angle doubling of the circle and prove that they admit positive Lyapunov exponents almost everywhere and an absolutely continuous invariant probability measure. This extends corresponding results of M. Viana and J.F. Alves for skew-products over linear strongly expanding map of the circle.