English

Composable Uncertainty in Symmetric Monoidal Categories for Design Problems (Extended Version)

Category Theory 2025-09-03 v3 Systems and Control Systems and Control

Abstract

Applied category theory often studies symmetric monoidal categories (SMCs) whose morphisms represent open systems. These structures naturally accommodate complex wiring patterns, leveraging (co)monoidal structures for splitting and merging wires, or compact closed structures for feedback. A key example is the compact closed SMC of design problems (DP), which enables a compositional approach to co-design in engineering. However, in practice, the systems of interest may not be fully known. Recently, Markov categories have emerged as a powerful framework for modeling uncertain processes. In this work, we demonstrate how to integrate this perspective into the study of open systems while preserving consistency with the underlying SMC structure. To this end, we employ the change-of-base construction for enriched categories, replacing the morphisms of a symmetric monoidal V\mathcal{V}-category C\mathcal{C} with parametric maps AC(X,Y)A \to \mathcal{C}(X,Y) in a Markov category induced by a symmetric monoidal monad. This results in a symmetric monoidal 2-category NCN_*\mathcal{C} with the same objects as C\mathcal{C} and reparametrization 2-cells. By choosing different monads, we capture various types of uncertainty. The category underlying C\mathcal{C} embeds into NCN_*\mathcal{C} via a strict symmetric monoidal functor, allowing (co)monoidal and compact closed structures to be transferred. Applied to DP, this construction leads to categories of practical relevance, such as parametrized design problems for optimization, and parametrized distributions of design problems for decision theory and Bayesian learning.

Keywords

Cite

@article{arxiv.2503.17274,
  title  = {Composable Uncertainty in Symmetric Monoidal Categories for Design Problems (Extended Version)},
  author = {Marius Furter and Yujun Huang and Gioele Zardini},
  journal= {arXiv preprint arXiv:2503.17274},
  year   = {2025}
}

Comments

23 pages, 2 figures, accepted to Applied Category Theory 2025

R2 v1 2026-06-28T22:29:58.373Z