Metamath Proof Explorer

Theorem efmndtset

Description: The topology of the monoid of endofunctions on A . This component is defined on a larger set than the true base - the product topology is defined on the set of all functions, not just endofunctions - but the definition of TopOpen ensures that it is trimmed down before it gets use. (Contributed by AV, 25-Jan-2024)

Ref Expression
Hypothesis efmndtset.g No typesetting found for |- G = ( EndoFMnd ` A ) with typecode |-
Assertion efmndtset A V 𝑡 A × 𝒫 A = TopSet G

Proof

Step Hyp Ref Expression
1 efmndtset.g Could not format G = ( EndoFMnd ` A ) : No typesetting found for |- G = ( EndoFMnd ` A ) with typecode |-
2 eqid A A = A A
3 eqid f A A , g A A f g = f A A , g A A f g
4 eqid 𝑡 A × 𝒫 A = 𝑡 A × 𝒫 A
5 1 2 3 4 efmnd A V G = Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A
6 5 fveq2d A V TopSet G = TopSet Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A
7 fvex 𝑡 A × 𝒫 A V
8 eqid Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A = Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A
9 8 topgrptset 𝑡 A × 𝒫 A V 𝑡 A × 𝒫 A = TopSet Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A
10 7 9 ax-mp 𝑡 A × 𝒫 A = TopSet Base ndx A A + ndx f A A , g A A f g TopSet ndx 𝑡 A × 𝒫 A
11 6 10 syl6reqr A V 𝑡 A × 𝒫 A = TopSet G