onsbnd

Description: The surreals of a given birthday are bounded above by that ordinal. (Contributed by Scott Fenton, 22-Feb-2026)

		Ref	Expression
	Assertion	onsbnd	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to B \leq_{s} A$

Proof

Step	Hyp	Ref	Expression
1		ral0	Could not format A. xR e. (/) B
2	1	a1i	Could not format ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) -> A. xR e. (/) B ~~A. xR e. (/) B~~
3		leftssold	$⊢ L (B) \subseteq Old (bday (B))$
4		bdayelon	$⊢ bday (A) \in On$
5		madebdayim	$⊢ B \in M (bday (A)) \to bday (B) \subseteq bday (A)$
6	5	adantl	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to bday (B) \subseteq bday (A)$
7		oldss	$⊢ (bday (A) \in On \land bday (B) \subseteq bday (A)) \to Old (bday (B)) \subseteq Old (bday (A))$
8	4 6 7	sylancr	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to Old (bday (B)) \subseteq Old (bday (A))$
9	3 8	sstrid	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to L (B) \subseteq Old (bday (A))$
10		onsleft	$⊢ A \in {On}_{s} \to Old (bday (A)) = L (A)$
11	10	adantr	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to Old (bday (A)) = L (A)$
12	9 11	sseqtrd	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to L (B) \subseteq L (A)$
13	12	sselda	Could not format ( ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) /\ yL e. ( _Left ` B ) ) -> yL e. ( _Left ` A ) ) : No typesetting found for \|- ( ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) /\ yL e. ( _Left ` B ) ) -> yL e. ( _Left ` A ) ) with typecode \|-
14		leftlt	Could not format ( yL e. ( _Left ` A ) -> yL yL
15	13 14	syl	Could not format ( ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) /\ yL e. ( _Left ` B ) ) -> yL yL
16	15	ralrimiva	Could not format ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) -> A. yL e. ( _Left ` B ) yL ~~A. yL e. ( _Left ` B ) yL~~
17		lltropt	$⊢ L (B) ≪_{s} R (B)$
18	17	a1i	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to L (B) ≪_{s} R (B)$
19		leftssno	$⊢ L (A) \subseteq No$
20		fvex	$⊢ L (A) \in V$
21	20	elpw	$⊢ L (A) \in 𝒫 No \leftrightarrow L (A) \subseteq No$
22	19 21	mpbir	$⊢ L (A) \in 𝒫 No$
23		nulssgt	$⊢ L (A) \in 𝒫 No \to L (A) ≪_{s} \emptyset$
24	22 23	mp1i	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to L (A) ≪_{s} \emptyset$
25		madessno	$⊢ M (bday (A)) \subseteq No$
26	25	sseli	$⊢ B \in M (bday (A)) \to B \in No$
27	26	adantl	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to B \in No$
28		lrcut	$⊢ B \in No \to L (B) \|_{s} R (B) = B$
29	27 28	syl	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to L (B) \|_{s} R (B) = B$
30	29	eqcomd	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to B = L (B) \|_{s} R (B)$
31		onscutleft	$⊢ A \in {On}_{s} \to A = L (A) \|_{s} \emptyset$
32	31	adantr	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to A = L (A) \|_{s} \emptyset$
33	18 24 30 32	slerecd	Could not format ( ( A e. On_s /\ B e. ( _Made ` ( bday ` A ) ) ) -> ( B <_s A <-> ( A. xR e. (/) B ~~( B <_s A <-> ( A. xR e. (/) B~~
34	2 16 33	mpbir2and	$⊢ (A \in {On}_{s} \land B \in M (bday (A))) \to B \leq_{s} A$

Metamath Proof Explorer

Theorem onsbnd

Proof