English

Idempotent plethories

Commutative Algebra 2025-06-11 v4

Abstract

Let kk be a commutative ring with identity. A {\it kk-plethory} is a commutative kk-algebra PP together with a comonad structure WPW_P, called the {\it PP-Witt ring} functor, on the covariant functor that it represents. We say that a kk-plethory PP is {\it idempotent} if the command WPW_P is idempotent, or equivalently if the map from the trivial kk-plethory k[e]k[e] to PP is a kk-plethory epimorphism. We prove several results on idempotent plethories. We also study the kk-plethories contained in K[e]K[e], where KK is the total quotient ring of kk, which are necessarily idempotent and contained in Int(k)={fK[e]:f(k)k}\operatorname{Int}(k) = \{f \in K[e]: f(k) \subseteq k\}. For example, for any ring ll between kk and KK we find necessary and sufficient conditions---all of which hold if kk is a integral domain of Krull type---so that the ring Intl(k)=Int(k)l[e]\operatorname{Int}_l(k) = \operatorname{Int}(k) \cap l[e] has the structure, necessarily unique and idempotent, of a kk-plethory with unit given by the inclusion k[e]Intl(k)k[e] \longrightarrow \operatorname{Int}_l(k). Our results, when applied to the binomial plethory Int(Z)\operatorname{Int}({\mathbb Z}), specialize to known results on binomial rings.

Keywords

Cite

@article{arxiv.1505.06493,
  title  = {Idempotent plethories},
  author = {Jesse Elliott},
  journal= {arXiv preprint arXiv:1505.06493},
  year   = {2025}
}

Comments

I found some critical errors that I was unable to fix

R2 v1 2026-06-22T09:40:32.236Z