Germs in a poset
Combinatorics
2020-12-10 v1 Category Theory
Group Theory
Rings and Algebras
Abstract
Motivated by the theory of correspondence functors, we introduce the notion of {\em germ} in a finite poset, and the notion of {\em germ extension} of a poset. We show that any finite poset admits a largest germ extension called its {\em germ closure}. We say that a subset of a finite lattice is {\em germ extensible} in if the germ closure of naturally embeds in . We show that any for any subset of a finite lattice , there is a unique germ extensible subset of such that , where is the embedding of the germ closure of .
Cite
@article{arxiv.2012.05171,
title = {Germs in a poset},
author = {Serge Bouc},
journal= {arXiv preprint arXiv:2012.05171},
year = {2020}
}