Deriving the Giry algebras on standard Borel spaces using R∞-generalized points

Abstract

The Giry monad on the category of measurable spaces restricts to the full subcategory of standard Borel spaces, Std, which we show is amenable to analysis. Std contains the space R∞ which is the one-point compactification of the real numbers. By viewing probability measures P ∈ G(A) as functionals operating on measurable functions A → R∞, and taking the restriction of those functionals to operate on affine measurable functions we show that A HomR∞R∞(R∞A|,R∞) for all object A lying in the subcategory StdCvx of Std. The objects of StdCvx are standard spaces with a convex space structure which satisfies the generic ``fullness property''. The morphisms of the category StdCvx are affine measurable functions. The isomorphism is equivalent to the statement that the full subcategory of StdCvx consisting of the single object R∞ is codense in StdCvx which allows us to easily construct the G-algebras of objects in StdCvx. This permits an adjoint factorization of the Giry monad as the composite of Std G StdCvx, which is the Giry monad functor viewed as a functor into StdCvx, and the partial forgetful functor StdCvx UCvx Std which forgets the convex space structure. We prove that the category StdCvx is the category of algebras of the G-monad.