mapdom1

Description: Order-preserving property of set exponentiation. Theorem 6L(c) of Enderton p. 149. (Contributed by NM, 27-Jul-2004) (Revised by Mario Carneiro, 9-Mar-2013)

		Ref	Expression
	Assertion	mapdom1	$⊢ A ≼ B \to (A^{C}) ≼ (B^{C})$

Proof

Step	Hyp	Ref	Expression
1		reldom	$⊢ Rel ≼$
2	1	brrelex2i	$⊢ A ≼ B \to B \in V$
3		domeng	$⊢ B \in V \to (A ≼ B \leftrightarrow \exists x (A \approx x \land x \subseteq B))$
4	2 3	syl	$⊢ A ≼ B \to (A ≼ B \leftrightarrow \exists x (A \approx x \land x \subseteq B))$
5	4	ibi	$⊢ A ≼ B \to \exists x (A \approx x \land x \subseteq B)$
6	5	adantr	$⊢ (A ≼ B \land C \in V) \to \exists x (A \approx x \land x \subseteq B)$
7		simpl	$⊢ (A \approx x \land x \subseteq B) \to A \approx x$
8		enrefg	$⊢ C \in V \to C \approx C$
9	8	adantl	$⊢ (A ≼ B \land C \in V) \to C \approx C$
10		mapen	$⊢ (A \approx x \land C \approx C) \to (A^{C}) \approx (x^{C})$
11	7 9 10	syl2anr	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to (A^{C}) \approx (x^{C})$
12		ovex	$⊢ B^{C} \in V$
13	2	ad2antrr	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to B \in V$
14		simprr	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to x \subseteq B$
15		mapss	$⊢ (B \in V \land x \subseteq B) \to x^{C} \subseteq B^{C}$
16	13 14 15	syl2anc	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to x^{C} \subseteq B^{C}$
17		ssdomg	$⊢ B^{C} \in V \to (x^{C} \subseteq B^{C} \to (x^{C}) ≼ (B^{C}))$
18	12 16 17	mpsyl	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to (x^{C}) ≼ (B^{C})$
19		endomtr	$⊢ ((A^{C}) \approx (x^{C}) \land (x^{C}) ≼ (B^{C})) \to (A^{C}) ≼ (B^{C})$
20	11 18 19	syl2anc	$⊢ ((A ≼ B \land C \in V) \land (A \approx x \land x \subseteq B)) \to (A^{C}) ≼ (B^{C})$
21	6 20	exlimddv	$⊢ (A ≼ B \land C \in V) \to (A^{C}) ≼ (B^{C})$
22		elmapex	$⊢ x \in (A^{C}) \to (A \in V \land C \in V)$
23	22	simprd	$⊢ x \in (A^{C}) \to C \in V$
24	23	con3i	$⊢ \neg C \in V \to \neg x \in (A^{C})$
25	24	eq0rdv	$⊢ \neg C \in V \to A^{C} = \emptyset$
26	25	adantl	$⊢ (A ≼ B \land \neg C \in V) \to A^{C} = \emptyset$
27	12	0dom	$⊢ \emptyset ≼ (B^{C})$
28	26 27	eqbrtrdi	$⊢ (A ≼ B \land \neg C \in V) \to (A^{C}) ≼ (B^{C})$
29	21 28	pm2.61dan	$⊢ A ≼ B \to (A^{C}) ≼ (B^{C})$

Metamath Proof Explorer

Theorem mapdom1

Proof