s1chn

Description: A singleton word is always a chain. (Contributed by Thierry Arnoux, 19-Oct-2025)

		Ref	Expression
	Hypothesis	s1chn.1	$⊢ φ \to X \in A$
	Assertion	s1chn	$⊢ φ \to ⟨“ X ”⟩ \in {Chain}_{A} \underset{˙}{<}$

Step	Hyp	Ref	Expression
1		s1chn.1	$⊢ φ \to X \in A$
2	1	s1cld	$⊢ φ \to ⟨“ X ”⟩ \in Word A$
3		ral0	$⊢ \forall n \in \emptyset ⟨“ X ”⟩ (n - 1) \underset{˙}{<} ⟨“ X ”⟩ (n)$
4		s1dm	$⊢ dom ⟨“ X ”⟩ = \{0\}$
5	4	difeq1i	$⊢ dom ⟨“ X ”⟩ ∖ \{0\} = \{0\} ∖ \{0\}$
6		difid	$⊢ \{0\} ∖ \{0\} = \emptyset$
7	5 6	eqtri	$⊢ dom ⟨“ X ”⟩ ∖ \{0\} = \emptyset$
8	7	raleqi	$⊢ \forall n \in (dom ⟨“ X ”⟩ ∖ \{0\}) ⟨“ X ”⟩ (n - 1) \underset{˙}{<} ⟨“ X ”⟩ (n) \leftrightarrow \forall n \in \emptyset ⟨“ X ”⟩ (n - 1) \underset{˙}{<} ⟨“ X ”⟩ (n)$
9	3 8	mpbir	$⊢ \forall n \in (dom ⟨“ X ”⟩ ∖ \{0\}) ⟨“ X ”⟩ (n - 1) \underset{˙}{<} ⟨“ X ”⟩ (n)$
10		ischn	$⊢ ⟨“ X ”⟩ \in {Chain}_{A} \underset{˙}{<} \leftrightarrow (⟨“ X ”⟩ \in Word A \land \forall n \in (dom ⟨“ X ”⟩ ∖ \{0\}) ⟨“ X ”⟩ (n - 1) \underset{˙}{<} ⟨“ X ”⟩ (n))$
11	2 9 10	sylanblrc	$⊢ φ \to ⟨“ X ”⟩ \in {Chain}_{A} \underset{˙}{<}$

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