We define a notion of stable and measurable map between cones endowed with
measurability tests and show that it forms a cpo-enriched cartesian closed
category. This category gives a denotational model of an extension of PCF
supporting the main primitives of probabilistic functional programming, like
continuous and discrete probabilistic distributions, sampling, conditioning and
full recursion. We prove the soundness and adequacy of this model with respect
to a call-by-name operational semantics and give some examples of its
denotations
