Metamath Proof Explorer

Theorem ttc00

Description: A class has an empty transitive closure iff it is the empty set. (Contributed by Matthew House, 6-Apr-2026)

Ref Expression
Assertion ttc00 Could not format assertion : No typesetting found for |- ( A = (/) <-> TC+ A = (/) ) with typecode |-

Proof

Step Hyp Ref Expression
1 ttceq Could not format ( A = (/) -> TC+ A = TC+ (/) ) : No typesetting found for |- ( A = (/) -> TC+ A = TC+ (/) ) with typecode |-
2 ttc0 Could not format TC+ (/) = (/) : No typesetting found for |- TC+ (/) = (/) with typecode |-
3 1 2 eqtrdi Could not format ( A = (/) -> TC+ A = (/) ) : No typesetting found for |- ( A = (/) -> TC+ A = (/) ) with typecode |-
4 ttcid Could not format A C_ TC+ A : No typesetting found for |- A C_ TC+ A with typecode |-
5 sseq2 Could not format ( TC+ A = (/) -> ( A C_ TC+ A <-> A C_ (/) ) ) : No typesetting found for |- ( TC+ A = (/) -> ( A C_ TC+ A <-> A C_ (/) ) ) with typecode |-
6 4 5 mpbii Could not format ( TC+ A = (/) -> A C_ (/) ) : No typesetting found for |- ( TC+ A = (/) -> A C_ (/) ) with typecode |-
7 ss0 A A =
8 6 7 syl Could not format ( TC+ A = (/) -> A = (/) ) : No typesetting found for |- ( TC+ A = (/) -> A = (/) ) with typecode |-
9 3 8 impbii Could not format ( A = (/) <-> TC+ A = (/) ) : No typesetting found for |- ( A = (/) <-> TC+ A = (/) ) with typecode |-