Metamath Proof Explorer


Theorem hashnnltb

Description: The # function on _om preserves the ordering. (Contributed by Eric Schmidt, 7-Jul-2026)

Ref Expression
Assertion hashnnltb A ω B ω A B A < B

Proof

Step Hyp Ref Expression
1 hashnnlt B ω A B A < B
2 1 ex B ω A B A < B
3 2 adantl A ω B ω A B A < B
4 hashss A ω B A B A
5 4 ex A ω B A B A
6 5 adantr A ω B ω B A B A
7 nnon B ω B On
8 nnon A ω A On
9 ontri1 B On A On B A ¬ A B
10 7 8 9 syl2anr A ω B ω B A ¬ A B
11 hashxrcl B ω B *
12 hashxrcl A ω A *
13 xrlenlt B * A * B A ¬ A < B
14 11 12 13 syl2anr A ω B ω B A ¬ A < B
15 6 10 14 3imtr3d A ω B ω ¬ A B ¬ A < B
16 3 15 impcon4bid A ω B ω A B A < B