Metamath Proof Explorer


Theorem usgr1v0edg

Description: A class with one (or no) vertex is a simple graph if and only if it has no edges. (Contributed by Alexander van der Vekens, 13-Oct-2017) (Revised by AV, 18-Oct-2020)

Ref Expression
Assertion usgr1v0edg G W Vtx G = A Fun iEdg G G USGraph Edg G =

Proof

Step Hyp Ref Expression
1 usgr1v G W Vtx G = A G USGraph iEdg G =
2 1 3adant3 G W Vtx G = A Fun iEdg G G USGraph iEdg G =
3 funrel Fun iEdg G Rel iEdg G
4 relrn0 Rel iEdg G iEdg G = ran iEdg G =
5 3 4 syl Fun iEdg G iEdg G = ran iEdg G =
6 5 3ad2ant3 G W Vtx G = A Fun iEdg G iEdg G = ran iEdg G =
7 edgval Edg G = ran iEdg G
8 7 eqcomi ran iEdg G = Edg G
9 8 eqeq1i ran iEdg G = Edg G =
10 9 a1i G W Vtx G = A Fun iEdg G ran iEdg G = Edg G =
11 2 6 10 3bitrd G W Vtx G = A Fun iEdg G G USGraph Edg G =