Diffeological statistical models, the Fisher metric and probabilistic mappings

Abstract

In this note we introduce the notion of a Ck-diffeological statistical model, which allows us to apply the theory of diffeological spaces to (possibly singular) statistical models. In particular, we introduce a class of almost 2-integrable Ck-diffeological statistical models that encompasses all known statistical models for which the Fisher metric is defined. This class contains a statistical model which does not appear in the Ay-Jost-L\e-Schwachh\"ofer theory of parametrized measure models. Then we show that for any positive integer k the class of almost 2-integrable Ck-diffeological statistical models is preserved under probabilistic mappings. Furthermore, the monotonicity theorem for the Fisher metric also holds for this class. As a consequence, the Fisher metric on an almost 2-integrable Ck-diffeological statistical model P ⊂ P( X) is preserved under any probabilistic mapping T: X Y that is sufficient w.r.t. P. Finally we extend the Cram\'er-Rao inequality to the class of 2-integrable Ck-diffeological statistical models.