Robust Topology and the Hausdorff-Smyth Monad on Metric Spaces over Continuous Quantales

Abstract

We define a (preorder-enriched) category Met of quantale-valued metric spaces and uniformly continuous maps, with the essential requirement that the quantales are continuous. For each object (X,d,Q) in this category, where X is the carrier set, Q is a continuous quantale, and d: X × X Q is the metric, we consider a topology τd on X, which generalizes the open ball topology, and a topology τd,R on the powerset P(X), called the robust topology, which captures robustness with respect to small perturbations of parameters. We define a (preorder-enriched) monad PS on Met, called the Hausdorff-Smyth monad, which captures the robust topology, in the sense that the open ball topology of the object PS(X,d,Q) coincides with the robust topology τd,R for the object (X,d,Q). We prove that every topology arises from a quantale-valued metric. As such, our framework provides a foundation for quantitative reasoning about imprecision and robustness in a wide range of computational and physical systems.