hashdom

Description: Dominance relation for the size function. (Contributed by Mario Carneiro, 22-Sep-2013) (Revised by Mario Carneiro, 22-Apr-2015)

		Ref	Expression
	Assertion	hashdom	$⊢ (A \in Fin \land B \in V) \to (\|A\| \leq \|B\| \leftrightarrow A ≼ B)$

Proof

Step	Hyp	Ref	Expression
1		fzfi	$⊢ (1 \dots \|B\| - \|A\|) \in Fin$
2		ficardom	$⊢ (1 \dots \|B\| - \|A\|) \in Fin \to card ((1 \dots \|B\| - \|A\|)) \in ω$
3	1 2	ax-mp	$⊢ card ((1 \dots \|B\| - \|A\|)) \in ω$
4		eqid	$⊢ {rec ((x \in V ⟼ x + 1), 0) ↾}_{ω} = {rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}$
5	4	hashgval	$⊢ A \in Fin \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) = \|A\|$
6	5	ad2antrr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) = \|A\|$
7	4	hashgval	$⊢ (1 \dots \|B\| - \|A\|) \in Fin \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|))) = \|(1 \dots \|B\| - \|A\|)\|$
8	1 7	ax-mp	$⊢ ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|))) = \|(1 \dots \|B\| - \|A\|)\|$
9		hashcl	$⊢ A \in Fin \to \|A\| \in ℕ_{0}$
10	9	ad2antrr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|A\| \in ℕ_{0}$
11		hashcl	$⊢ B \in Fin \to \|B\| \in ℕ_{0}$
12	11	ad2antlr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|B\| \in ℕ_{0}$
13		simpr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|A\| \leq \|B\|$
14		nn0sub2	$⊢ (\|A\| \in ℕ_{0} \land \|B\| \in ℕ_{0} \land \|A\| \leq \|B\|) \to \|B\| - \|A\| \in ℕ_{0}$
15	10 12 13 14	syl3anc	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|B\| - \|A\| \in ℕ_{0}$
16		hashfz1	$⊢ \|B\| - \|A\| \in ℕ_{0} \to \|(1 \dots \|B\| - \|A\|)\| = \|B\| - \|A\|$
17	15 16	syl	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|(1 \dots \|B\| - \|A\|)\| = \|B\| - \|A\|$
18	8 17	eqtrid	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|))) = \|B\| - \|A\|$
19	6 18	oveq12d	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|))) = \|A\| + \|B\| - \|A\|$
20	9	nn0cnd	$⊢ A \in Fin \to \|A\| \in ℂ$
21	11	nn0cnd	$⊢ B \in Fin \to \|B\| \in ℂ$
22		pncan3	$⊢ (\|A\| \in ℂ \land \|B\| \in ℂ) \to \|A\| + \|B\| - \|A\| = \|B\|$
23	20 21 22	syl2an	$⊢ (A \in Fin \land B \in Fin) \to \|A\| + \|B\| - \|A\| = \|B\|$
24	23	adantr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \|A\| + \|B\| - \|A\| = \|B\|$
25	19 24	eqtrd	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|))) = \|B\|$
26		ficardom	$⊢ A \in Fin \to card (A) \in ω$
27	26	ad2antrr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to card (A) \in ω$
28	4	hashgadd	$⊢ (card (A) \in ω \land card ((1 \dots \|B\| - \|A\|)) \in ω) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|)))$
29	27 3 28	sylancl	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card ((1 \dots \|B\| - \|A\|)))$
30	4	hashgval	$⊢ B \in Fin \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) = \|B\|$
31	30	ad2antlr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) = \|B\|$
32	25 29 31	3eqtr4d	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B))$
33	32	fveq2d	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)))) = {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)))$
34	4	hashgf1o	$⊢ ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) : ω \underset{1-1 onto}{⟶} ℕ_{0}$
35		nnacl	$⊢ (card (A) \in ω \land card ((1 \dots \|B\| - \|A\|)) \in ω) \to card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) \in ω$
36	27 3 35	sylancl	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) \in ω$
37		f1ocnvfv1	$⊢ (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) : ω \underset{1-1 onto}{⟶} ℕ_{0} \land card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) \in ω) \to {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)))) = card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))$
38	34 36 37	sylancr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)))) = card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))$
39		ficardom	$⊢ B \in Fin \to card (B) \in ω$
40	39	ad2antlr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to card (B) \in ω$
41		f1ocnvfv1	$⊢ (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) : ω \underset{1-1 onto}{⟶} ℕ_{0} \land card (B) \in ω) \to {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B))) = card (B)$
42	34 40 41	sylancr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to {({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω})}^{-1} (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B))) = card (B)$
43	33 38 42	3eqtr3d	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) = card (B)$
44		oveq2	$⊢ y = card ((1 \dots \|B\| - \|A\|)) \to card (A) +_{𝑜} y = card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|))$
45	44	eqeq1d	$⊢ y = card ((1 \dots \|B\| - \|A\|)) \to (card (A) +_{𝑜} y = card (B) \leftrightarrow card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) = card (B))$
46	45	rspcev	$⊢ (card ((1 \dots \|B\| - \|A\|)) \in ω \land card (A) +_{𝑜} card ((1 \dots \|B\| - \|A\|)) = card (B)) \to \exists y \in ω card (A) +_{𝑜} y = card (B)$
47	3 43 46	sylancr	$⊢ ((A \in Fin \land B \in Fin) \land \|A\| \leq \|B\|) \to \exists y \in ω card (A) +_{𝑜} y = card (B)$
48	47	ex	$⊢ (A \in Fin \land B \in Fin) \to (\|A\| \leq \|B\| \to \exists y \in ω card (A) +_{𝑜} y = card (B))$
49		cardnn	$⊢ y \in ω \to card (y) = y$
50	49	adantl	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to card (y) = y$
51	50	oveq2d	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to card (A) +_{𝑜} card (y) = card (A) +_{𝑜} y$
52	51	eqeq1d	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to (card (A) +_{𝑜} card (y) = card (B) \leftrightarrow card (A) +_{𝑜} y = card (B))$
53		fveq2	$⊢ card (A) +_{𝑜} card (y) = card (B) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B))$
54		nnfi	$⊢ y \in ω \to y \in Fin$
55		ficardom	$⊢ y \in Fin \to card (y) \in ω$
56	4	hashgadd	$⊢ (card (A) \in ω \land card (y) \in ω) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (y))$
57	26 55 56	syl2an	$⊢ (A \in Fin \land y \in Fin) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (y))$
58	4	hashgval	$⊢ y \in Fin \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (y)) = \|y\|$
59	5 58	oveqan12d	$⊢ (A \in Fin \land y \in Fin) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A)) + ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (y)) = \|A\| + \|y\|$
60	57 59	eqtrd	$⊢ (A \in Fin \land y \in Fin) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = \|A\| + \|y\|$
61	60	adantlr	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = \|A\| + \|y\|$
62	30	ad2antlr	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) = \|B\|$
63	61 62	eqeq12d	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) \leftrightarrow \|A\| + \|y\| = \|B\|)$
64		hashcl	$⊢ y \in Fin \to \|y\| \in ℕ_{0}$
65	64	nn0ge0d	$⊢ y \in Fin \to 0 \leq \|y\|$
66	65	adantl	$⊢ (A \in Fin \land y \in Fin) \to 0 \leq \|y\|$
67	9	nn0red	$⊢ A \in Fin \to \|A\| \in ℝ$
68	64	nn0red	$⊢ y \in Fin \to \|y\| \in ℝ$
69		addge01	$⊢ (\|A\| \in ℝ \land \|y\| \in ℝ) \to (0 \leq \|y\| \leftrightarrow \|A\| \leq \|A\| + \|y\|)$
70	67 68 69	syl2an	$⊢ (A \in Fin \land y \in Fin) \to (0 \leq \|y\| \leftrightarrow \|A\| \leq \|A\| + \|y\|)$
71	66 70	mpbid	$⊢ (A \in Fin \land y \in Fin) \to \|A\| \leq \|A\| + \|y\|$
72	71	adantlr	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to \|A\| \leq \|A\| + \|y\|$
73		breq2	$⊢ \|A\| + \|y\| = \|B\| \to (\|A\| \leq \|A\| + \|y\| \leftrightarrow \|A\| \leq \|B\|)$
74	72 73	syl5ibcom	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to (\|A\| + \|y\| = \|B\| \to \|A\| \leq \|B\|)$
75	63 74	sylbid	$⊢ ((A \in Fin \land B \in Fin) \land y \in Fin) \to (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) \to \|A\| \leq \|B\|)$
76	54 75	sylan2	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to (({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (A) +_{𝑜} card (y)) = ({rec ((x \in V ⟼ x + 1), 0) ↾}_{ω}) (card (B)) \to \|A\| \leq \|B\|)$
77	53 76	syl5	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to (card (A) +_{𝑜} card (y) = card (B) \to \|A\| \leq \|B\|)$
78	52 77	sylbird	$⊢ ((A \in Fin \land B \in Fin) \land y \in ω) \to (card (A) +_{𝑜} y = card (B) \to \|A\| \leq \|B\|)$
79	78	rexlimdva	$⊢ (A \in Fin \land B \in Fin) \to (\exists y \in ω card (A) +_{𝑜} y = card (B) \to \|A\| \leq \|B\|)$
80	48 79	impbid	$⊢ (A \in Fin \land B \in Fin) \to (\|A\| \leq \|B\| \leftrightarrow \exists y \in ω card (A) +_{𝑜} y = card (B))$
81		nnawordex	$⊢ (card (A) \in ω \land card (B) \in ω) \to (card (A) \subseteq card (B) \leftrightarrow \exists y \in ω card (A) +_{𝑜} y = card (B))$
82	26 39 81	syl2an	$⊢ (A \in Fin \land B \in Fin) \to (card (A) \subseteq card (B) \leftrightarrow \exists y \in ω card (A) +_{𝑜} y = card (B))$
83		finnum	$⊢ A \in Fin \to A \in dom card$
84		finnum	$⊢ B \in Fin \to B \in dom card$
85		carddom2	$⊢ (A \in dom card \land B \in dom card) \to (card (A) \subseteq card (B) \leftrightarrow A ≼ B)$
86	83 84 85	syl2an	$⊢ (A \in Fin \land B \in Fin) \to (card (A) \subseteq card (B) \leftrightarrow A ≼ B)$
87	80 82 86	3bitr2d	$⊢ (A \in Fin \land B \in Fin) \to (\|A\| \leq \|B\| \leftrightarrow A ≼ B)$
88	87	adantlr	$⊢ ((A \in Fin \land B \in V) \land B \in Fin) \to (\|A\| \leq \|B\| \leftrightarrow A ≼ B)$
89		hashxrcl	$⊢ A \in Fin \to \|A\| \in ℝ^{*}$
90	89	ad2antrr	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to \|A\| \in ℝ^{*}$
91		pnfge	$⊢ \|A\| \in ℝ^{*} \to \|A\| \leq +∞$
92	90 91	syl	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to \|A\| \leq +∞$
93		hashinf	$⊢ (B \in V \land \neg B \in Fin) \to \|B\| = +∞$
94	93	adantll	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to \|B\| = +∞$
95	92 94	breqtrrd	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to \|A\| \leq \|B\|$
96		isinffi	$⊢ (\neg B \in Fin \land A \in Fin) \to \exists f f : A \underset{1-1}{⟶} B$
97	96	ancoms	$⊢ (A \in Fin \land \neg B \in Fin) \to \exists f f : A \underset{1-1}{⟶} B$
98	97	adantlr	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to \exists f f : A \underset{1-1}{⟶} B$
99		brdomg	$⊢ B \in V \to (A ≼ B \leftrightarrow \exists f f : A \underset{1-1}{⟶} B)$
100	99	ad2antlr	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to (A ≼ B \leftrightarrow \exists f f : A \underset{1-1}{⟶} B)$
101	98 100	mpbird	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to A ≼ B$
102	95 101	2thd	$⊢ ((A \in Fin \land B \in V) \land \neg B \in Fin) \to (\|A\| \leq \|B\| \leftrightarrow A ≼ B)$
103	88 102	pm2.61dan	$⊢ (A \in Fin \land B \in V) \to (\|A\| \leq \|B\| \leftrightarrow A ≼ B)$

Metamath Proof Explorer

Theorem hashdom

Proof