Limit distribution in the q-CLT for q 1 can not have a compact support

Abstract

In a recent paper Hilhorst Hilhorst2010 illustrated that the q-Fourier transform for q>1 is not invertible in the space of density functions. Using an invariance principle he constructed a family of densities with the same q-Fourier transform and claimed that q-Gaussians are not mathematically proved to be attractors. We show here that none of the distributions constructed in Hilhorst's counterexamples can be a limit distribution in the q-CLT, except the one whose support covers the whole real axis, which is precisely the q-Gaussian distribution.