Slender domains and compact domains

Publikation: Bidrag til tidsskriftTidsskriftartikelfagfællebedømt

We prove that a one-dimensional Noetherian domain is slender if and only if it is not a local complete ring. The latter condition for a general Noetherian domain characterizes the domains that are not algebraically compact. For a general Noetherian domain R we prove that R is algebraically compact if and only if R satisfies a condition slightly stronger than not being slender. In addition we enlarge considerably the number of classes of rings for which the question of slenderness can be answered. For instance we prove that any domain, not a field, essentially of finite type over a field is slender.
OriginalsprogEngelsk
TidsskriftForum Mathematicum
Vol/bind29
Udgave nummer4
Sider (fra-til)893-904
Antal sider12
ISSN0933-7741
DOI
StatusUdgivet - jul. 2017

ID: 180994542