zscut0

Description: Either the left or right set of a surreal integer is empty. (Contributed by Scott Fenton, 21-Feb-2026)

		Ref	Expression
	Assertion	zscut0	$⊢ A \in ℤ_{s} \to (L (A) = \emptyset \lor R (A) = \emptyset)$

Proof

Step	Hyp	Ref	Expression
1		elzn0s	$⊢ A \in ℤ_{s} \leftrightarrow (A \in No \land (A \in ℕ_{0s} \lor +_{s} (A) \in ℕ_{0s}))$
2		n0ons	$⊢ A \in ℕ_{0s} \to A \in {On}_{s}$
3		elons	$⊢ A \in {On}_{s} \leftrightarrow (A \in No \land R (A) = \emptyset)$
4	3	simprbi	$⊢ A \in {On}_{s} \to R (A) = \emptyset$
5	2 4	syl	$⊢ A \in ℕ_{0s} \to R (A) = \emptyset$
6	5	a1i	$⊢ A \in No \to (A \in ℕ_{0s} \to R (A) = \emptyset)$
7		simpl	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to A \in No$
8	7	negscld	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to +_{s} (A) \in No$
9		negsleft	$⊢ +_{s} (A) \in No \to L (+_{s} (+_{s} (A))) = +_{s} [R (+_{s} (A))]$
10	8 9	syl	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to L (+_{s} (+_{s} (A))) = +_{s} [R (+_{s} (A))]$
11		negnegs	$⊢ A \in No \to +_{s} (+_{s} (A)) = A$
12	11	fveq2d	$⊢ A \in No \to L (+_{s} (+_{s} (A))) = L (A)$
13	12	adantr	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to L (+_{s} (+_{s} (A))) = L (A)$
14		n0ons	$⊢ +_{s} (A) \in ℕ_{0s} \to +_{s} (A) \in {On}_{s}$
15		elons	$⊢ +_{s} (A) \in {On}_{s} \leftrightarrow (+_{s} (A) \in No \land R (+_{s} (A)) = \emptyset)$
16	15	simprbi	$⊢ +_{s} (A) \in {On}_{s} \to R (+_{s} (A)) = \emptyset$
17	14 16	syl	$⊢ +_{s} (A) \in ℕ_{0s} \to R (+_{s} (A)) = \emptyset$
18	17	adantl	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to R (+_{s} (A)) = \emptyset$
19	18	imaeq2d	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to +_{s} [R (+_{s} (A))] = +_{s} [\emptyset]$
20		ima0	$⊢ +_{s} [\emptyset] = \emptyset$
21	19 20	eqtrdi	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to +_{s} [R (+_{s} (A))] = \emptyset$
22	10 13 21	3eqtr3d	$⊢ (A \in No \land +_{s} (A) \in ℕ_{0s}) \to L (A) = \emptyset$
23	22	ex	$⊢ A \in No \to (+_{s} (A) \in ℕ_{0s} \to L (A) = \emptyset)$
24	6 23	orim12d	$⊢ A \in No \to ((A \in ℕ_{0s} \lor +_{s} (A) \in ℕ_{0s}) \to (R (A) = \emptyset \lor L (A) = \emptyset))$
25	24	imp	$⊢ (A \in No \land (A \in ℕ_{0s} \lor +_{s} (A) \in ℕ_{0s})) \to (R (A) = \emptyset \lor L (A) = \emptyset)$
26	25	orcomd	$⊢ (A \in No \land (A \in ℕ_{0s} \lor +_{s} (A) \in ℕ_{0s})) \to (L (A) = \emptyset \lor R (A) = \emptyset)$
27	1 26	sylbi	$⊢ A \in ℤ_{s} \to (L (A) = \emptyset \lor R (A) = \emptyset)$

Metamath Proof Explorer

Theorem zscut0

Proof