English

Combining Semilattices and Semimodules

Computation and Language 2021-03-30 v3 Logic

Abstract

We describe the canonical weak distributive law δ ⁣:SPPS\delta \colon \mathcal S \mathcal P \to \mathcal P \mathcal S of the powerset monad P\mathcal P over the SS-left-semimodule monad S\mathcal S, for a class of semirings SS. We show that the composition of P\mathcal P with S\mathcal S by means of such δ\delta yields almost the monad of convex subsets previously introduced by Jacobs: the only difference consists in the absence in Jacobs's monad of the empty convex set. We provide a handy characterisation of the canonical weak lifting of P\mathcal P to EM(S)\mathbb{EM}(\mathcal S) as well as an algebraic theory for the resulting composed monad. Finally, we restrict the composed monad to finitely generated convex subsets and we show that it is presented by an algebraic theory combining semimodules and semilattices with bottom, which are the algebras for the finite powerset monad Pf\mathcal P_f.

Cite

@article{arxiv.2012.14778,
  title  = {Combining Semilattices and Semimodules},
  author = {Filippo Bonchi and Alessio Santamaria},
  journal= {arXiv preprint arXiv:2012.14778},
  year   = {2021}
}
R2 v1 2026-06-23T21:33:30.902Z