Definition 87.4.8 (0AMV)—The Stacks project

Table of contents
Part 5: Topics in Geometry
Chapter 87: Formal Algebraic Spaces
Section 87.4: Topological rings and modules
Definition 87.4.8 (cite)

Definition 87.4.8. Let $A$ be a linearly topologized ring.

An element $f \in A$ is called topologically nilpotent if $f^ n \to 0$ as $n \to \infty $.
A weak ideal of definition for $A$ is an open ideal $I \subset A$ consisting entirely of topologically nilpotent elements.
We say $A$ is weakly pre-admissible if $A$ has a weak ideal of definition.
We say $A$ is weakly admissible if $A$ is weakly pre-admissible and complete ¹.

[1] By our conventions this includes separated.

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