Idempotent plethories
Abstract
Let be a commutative ring with identity. A {\it -plethory} is a commutative -algebra together with a comonad structure , called the {\it -Witt ring} functor, on the covariant functor that it represents. We say that a -plethory is {\it idempotent} if the command is idempotent, or equivalently if the map from the trivial -plethory to is a -plethory epimorphism. We prove several results on idempotent plethories. We also study the -plethories contained in , where is the total quotient ring of , which are necessarily idempotent and contained in . For example, for any ring between and we find necessary and sufficient conditions---all of which hold if is a integral domain of Krull type---so that the ring has the structure, necessarily unique and idempotent, of a -plethory with unit given by the inclusion . Our results, when applied to the binomial plethory , specialize to known results on binomial rings.
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