Convergence in Distribution of the One-Dimensional Kohonen Algorithms when the Stimuli are not Uniform

We show that the one-dimensional self-organizing Kohonen algorithm (with zero or two neighbours and constant step .) is a Doeblin recurrent Markov chain provided that the stimuli distribution . is lower bounded by the Lebesgue measure on some open set. Some properties of the invariant probability measure v. (support, absolute continuity, etc.) are established as well as its asymptotic behaviour as . . 0 and its robustness with respect to ..