Documentation

Mathlib.Topology.Algebra.Localization

Localization of topological rings #

The topological localization of a topological commutative ring R at a submonoid M is the ring Localization M endowed with the final ring topology of the natural homomorphism sending x : R to the equivalence class of (x, 1) in the localization of R at an M.

Main Results #

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def Localization.ringTopology {R : Type u_1} [CommRing R] [TopologicalSpace R] {M : Submonoid R} :
RingTopology (Localization M)

The ring topology on Localization M coinduced from the natural homomorphism sending x : R to the equivalence class of (x, 1).

Equations
Instances For
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    instance instTopologicalSpaceLocalization {R : Type u_1} [CommRing R] [TopologicalSpace R] {M : Submonoid R} :
    TopologicalSpace (Localization M)
    Equations
    • instTopologicalSpaceLocalization = Localization.ringTopology.toTopologicalSpace
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    instance instTopologicalRingLocalization {R : Type u_1} [CommRing R] [TopologicalSpace R] {M : Submonoid R} :
    TopologicalRing (Localization M)
    Equations
    • =