Linear topology
In algebra, a linear topology on a left A-module M is a topology on M that is invariant under translations and admits a fundamental system of neighborhood of 0 that consists of submodules of M. If there is such a topology, M is said to be linearly topologized. If A is given a discrete topology, then M becomes a topological A-module with respect to a linear topology.
See also
- Ring of restricted power series
References
- Bourbaki, N. (1972). Commutative algebra (Vol. 8). Hermann.
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