Metamath Proof Explorer

Theorem compsscnv

Description: Complementation on a power set lattice is an involution. (Contributed by Mario Carneiro, 17-May-2015)

Ref Expression
Hypothesis compss.a F=x𝒫AAx
Assertion compsscnv F-1=F

Proof

Step Hyp Ref Expression
1 compss.a F=x𝒫AAx
2 cnvopab yx|y𝒫Ax=Ay-1=xy|y𝒫Ax=Ay
3 difeq2 x=yAx=Ay
4 3 cbvmptv x𝒫AAx=y𝒫AAy
5 df-mpt y𝒫AAy=yx|y𝒫Ax=Ay
6 1 4 5 3eqtri F=yx|y𝒫Ax=Ay
7 6 cnveqi F-1=yx|y𝒫Ax=Ay-1
8 df-mpt x𝒫AAx=xy|x𝒫Ay=Ax
9 compsscnvlem y𝒫Ax=Ayx𝒫Ay=Ax
10 compsscnvlem x𝒫Ay=Axy𝒫Ax=Ay
11 9 10 impbii y𝒫Ax=Ayx𝒫Ay=Ax
12 11 opabbii xy|y𝒫Ax=Ay=xy|x𝒫Ay=Ax
13 8 1 12 3eqtr4i F=xy|y𝒫Ax=Ay
14 2 7 13 3eqtr4i F-1=F