Metamath Proof Explorer

Theorem infenaleph

Description: An infinite numerable set is equinumerous to an infinite initial ordinal. (Contributed by Jeff Hankins, 23-Oct-2009) (Revised by Mario Carneiro, 29-Apr-2015)

Ref Expression
Assertion infenaleph A dom card ω A x ran x A

Proof

Step Hyp Ref Expression
1 cardidm card card A = card A
2 cardom card ω = ω
3 simpr A dom card ω A ω A
4 omelon ω On
5 onenon ω On ω dom card
6 4 5 ax-mp ω dom card
7 simpl A dom card ω A A dom card
8 carddom2 ω dom card A dom card card ω card A ω A
9 6 7 8 sylancr A dom card ω A card ω card A ω A
10 3 9 mpbird A dom card ω A card ω card A
11 2 10 eqsstrrid A dom card ω A ω card A
12 cardalephex ω card A card card A = card A x On card A = x
13 11 12 syl A dom card ω A card card A = card A x On card A = x
14 1 13 mpbii A dom card ω A x On card A = x
15 eqcom card A = x x = card A
16 15 rexbii x On card A = x x On x = card A
17 14 16 sylib A dom card ω A x On x = card A
18 alephfnon Fn On
19 fvelrnb Fn On card A ran x On x = card A
20 18 19 ax-mp card A ran x On x = card A
21 17 20 sylibr A dom card ω A card A ran
22 cardid2 A dom card card A A
23 22 adantr A dom card ω A card A A
24 breq1 x = card A x A card A A
25 24 rspcev card A ran card A A x ran x A
26 21 23 25 syl2anc A dom card ω A x ran x A