smores3

Description: A strictly monotone function restricted to an ordinal remains strictly monotone. (Contributed by Andrew Salmon, 19-Nov-2011)

		Ref	Expression
	Assertion	smores3	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B) \land Ord B) \to Smo ({A ↾}_{C})$

Step	Hyp	Ref	Expression
1		dmres	$⊢ dom ({A ↾}_{B}) = B \cap dom A$
2		incom	$⊢ B \cap dom A = dom A \cap B$
3	1 2	eqtri	$⊢ dom ({A ↾}_{B}) = dom A \cap B$
4	3	eleq2i	$⊢ C \in dom ({A ↾}_{B}) \leftrightarrow C \in (dom A \cap B)$
5		smores	$⊢ (Smo ({A ↾}_{B}) \land C \in dom ({A ↾}_{B})) \to Smo ({({A ↾}_{B}) ↾}_{C})$
6	4 5	sylan2br	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B)) \to Smo ({({A ↾}_{B}) ↾}_{C})$
7	6	3adant3	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B) \land Ord B) \to Smo ({({A ↾}_{B}) ↾}_{C})$
8		elinel2	$⊢ C \in (dom A \cap B) \to C \in B$
9		ordelss	$⊢ (Ord B \land C \in B) \to C \subseteq B$
10	9	ancoms	$⊢ (C \in B \land Ord B) \to C \subseteq B$
11	8 10	sylan	$⊢ (C \in (dom A \cap B) \land Ord B) \to C \subseteq B$
12	11	3adant1	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B) \land Ord B) \to C \subseteq B$
13		resabs1	$⊢ C \subseteq B \to {({A ↾}_{B}) ↾}_{C} = {A ↾}_{C}$
14		smoeq	$⊢ {({A ↾}_{B}) ↾}_{C} = {A ↾}_{C} \to (Smo ({({A ↾}_{B}) ↾}_{C}) \leftrightarrow Smo ({A ↾}_{C}))$
15	12 13 14	3syl	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B) \land Ord B) \to (Smo ({({A ↾}_{B}) ↾}_{C}) \leftrightarrow Smo ({A ↾}_{C}))$
16	7 15	mpbid	$⊢ (Smo ({A ↾}_{B}) \land C \in (dom A \cap B) \land Ord B) \to Smo ({A ↾}_{C})$

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