We introduce different notions of wave front set for the functionals in the dual of the Colombeau algebra G_c(Ω) providing a way to measure the G and the G^∞- regularity in L(G_c(Ω),\tilde{C}). For the smaller family of functionals having a "basic structure'' we obtain a Fourier transform-characterization for this type of generalized wave front sets and results of noncharacteristic G and G^∞-regularity.

Supported by FWF (Austria), grant P16820-N04 and TWF (Tyrol), grant UNI-0404/305.