caubnd

Description: A Cauchy sequence of complex numbers is bounded. (Contributed by NM, 4-Apr-2005) (Revised by Mario Carneiro, 14-Feb-2014)

		Ref	Expression
	Hypothesis	cau3.1	$⊢ Z = ℤ_{\geq M}$
	Assertion	caubnd	$⊢ (\forall k \in Z F (k) \in ℂ \land \forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y$

Proof

Step	Hyp	Ref	Expression
1		cau3.1	$⊢ Z = ℤ_{\geq M}$
2		abscl	$⊢ F (k) \in ℂ \to \|F (k)\| \in ℝ$
3	2	ralimi	$⊢ \forall k \in Z F (k) \in ℂ \to \forall k \in Z \|F (k)\| \in ℝ$
4	1	r19.29uz	$⊢ (\forall k \in Z F (k) \in ℂ \land \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x) \to \exists j \in Z \forall k \in ℤ_{\geq j} (F (k) \in ℂ \land \|F (k) - F (j)\| < x)$
5	4	ex	$⊢ \forall k \in Z F (k) \in ℂ \to (\exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x \to \exists j \in Z \forall k \in ℤ_{\geq j} (F (k) \in ℂ \land \|F (k) - F (j)\| < x))$
6	5	ralimdv	$⊢ \forall k \in Z F (k) \in ℂ \to (\forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x \to \forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} (F (k) \in ℂ \land \|F (k) - F (j)\| < x))$
7	1	caubnd2	$⊢ \forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} (F (k) \in ℂ \land \|F (k) - F (j)\| < x) \to \exists z \in ℝ \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k)\| < z$
8	6 7	syl6	$⊢ \forall k \in Z F (k) \in ℂ \to (\forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x \to \exists z \in ℝ \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k)\| < z)$
9		fzssuz	$⊢ (M \dots j) \subseteq ℤ_{\geq M}$
10	9 1	sseqtrri	$⊢ (M \dots j) \subseteq Z$
11		ssralv	$⊢ (M \dots j) \subseteq Z \to (\forall k \in Z \|F (k)\| \in ℝ \to \forall k \in (M \dots j) \|F (k)\| \in ℝ)$
12	10 11	ax-mp	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to \forall k \in (M \dots j) \|F (k)\| \in ℝ$
13		fzfi	$⊢ (M \dots j) \in Fin$
14		fimaxre3	$⊢ ((M \dots j) \in Fin \land \forall k \in (M \dots j) \|F (k)\| \in ℝ) \to \exists x \in ℝ \forall k \in (M \dots j) \|F (k)\| \leq x$
15	13 14	mpan	$⊢ \forall k \in (M \dots j) \|F (k)\| \in ℝ \to \exists x \in ℝ \forall k \in (M \dots j) \|F (k)\| \leq x$
16		peano2re	$⊢ x \in ℝ \to x + 1 \in ℝ$
17	16	adantl	$⊢ (\forall k \in (M \dots j) \|F (k)\| \in ℝ \land x \in ℝ) \to x + 1 \in ℝ$
18		ltp1	$⊢ x \in ℝ \to x < x + 1$
19	18	adantl	$⊢ (\|F (k)\| \in ℝ \land x \in ℝ) \to x < x + 1$
20	16	adantl	$⊢ (\|F (k)\| \in ℝ \land x \in ℝ) \to x + 1 \in ℝ$
21		lelttr	$⊢ (\|F (k)\| \in ℝ \land x \in ℝ \land x + 1 \in ℝ) \to ((\|F (k)\| \leq x \land x < x + 1) \to \|F (k)\| < x + 1)$
22	20 21	mpd3an3	$⊢ (\|F (k)\| \in ℝ \land x \in ℝ) \to ((\|F (k)\| \leq x \land x < x + 1) \to \|F (k)\| < x + 1)$
23	19 22	mpan2d	$⊢ (\|F (k)\| \in ℝ \land x \in ℝ) \to (\|F (k)\| \leq x \to \|F (k)\| < x + 1)$
24	23	expcom	$⊢ x \in ℝ \to (\|F (k)\| \in ℝ \to (\|F (k)\| \leq x \to \|F (k)\| < x + 1))$
25	24	ralimdv	$⊢ x \in ℝ \to (\forall k \in (M \dots j) \|F (k)\| \in ℝ \to \forall k \in (M \dots j) (\|F (k)\| \leq x \to \|F (k)\| < x + 1))$
26	25	impcom	$⊢ (\forall k \in (M \dots j) \|F (k)\| \in ℝ \land x \in ℝ) \to \forall k \in (M \dots j) (\|F (k)\| \leq x \to \|F (k)\| < x + 1)$
27		ralim	$⊢ \forall k \in (M \dots j) (\|F (k)\| \leq x \to \|F (k)\| < x + 1) \to (\forall k \in (M \dots j) \|F (k)\| \leq x \to \forall k \in (M \dots j) \|F (k)\| < x + 1)$
28	26 27	syl	$⊢ (\forall k \in (M \dots j) \|F (k)\| \in ℝ \land x \in ℝ) \to (\forall k \in (M \dots j) \|F (k)\| \leq x \to \forall k \in (M \dots j) \|F (k)\| < x + 1)$
29		brralrspcev	$⊢ (x + 1 \in ℝ \land \forall k \in (M \dots j) \|F (k)\| < x + 1) \to \exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w$
30	17 28 29	syl6an	$⊢ (\forall k \in (M \dots j) \|F (k)\| \in ℝ \land x \in ℝ) \to (\forall k \in (M \dots j) \|F (k)\| \leq x \to \exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w)$
31	30	rexlimdva	$⊢ \forall k \in (M \dots j) \|F (k)\| \in ℝ \to (\exists x \in ℝ \forall k \in (M \dots j) \|F (k)\| \leq x \to \exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w)$
32	15 31	mpd	$⊢ \forall k \in (M \dots j) \|F (k)\| \in ℝ \to \exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w$
33	12 32	syl	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to \exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w$
34		max1	$⊢ (w \in ℝ \land z \in ℝ) \to w \leq if (w \leq z, z, w)$
35	34	3adant3	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to w \leq if (w \leq z, z, w)$
36		simp3	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to \|F (k)\| \in ℝ$
37		simp1	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to w \in ℝ$
38		ifcl	$⊢ (z \in ℝ \land w \in ℝ) \to if (w \leq z, z, w) \in ℝ$
39	38	ancoms	$⊢ (w \in ℝ \land z \in ℝ) \to if (w \leq z, z, w) \in ℝ$
40	39	3adant3	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to if (w \leq z, z, w) \in ℝ$
41		ltletr	$⊢ (\|F (k)\| \in ℝ \land w \in ℝ \land if (w \leq z, z, w) \in ℝ) \to ((\|F (k)\| < w \land w \leq if (w \leq z, z, w)) \to \|F (k)\| < if (w \leq z, z, w))$
42	36 37 40 41	syl3anc	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to ((\|F (k)\| < w \land w \leq if (w \leq z, z, w)) \to \|F (k)\| < if (w \leq z, z, w))$
43	35 42	mpan2d	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to (\|F (k)\| < w \to \|F (k)\| < if (w \leq z, z, w))$
44		max2	$⊢ (w \in ℝ \land z \in ℝ) \to z \leq if (w \leq z, z, w)$
45	44	3adant3	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to z \leq if (w \leq z, z, w)$
46		simp2	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to z \in ℝ$
47		ltletr	$⊢ (\|F (k)\| \in ℝ \land z \in ℝ \land if (w \leq z, z, w) \in ℝ) \to ((\|F (k)\| < z \land z \leq if (w \leq z, z, w)) \to \|F (k)\| < if (w \leq z, z, w))$
48	36 46 40 47	syl3anc	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to ((\|F (k)\| < z \land z \leq if (w \leq z, z, w)) \to \|F (k)\| < if (w \leq z, z, w))$
49	45 48	mpan2d	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to (\|F (k)\| < z \to \|F (k)\| < if (w \leq z, z, w))$
50	43 49	jaod	$⊢ (w \in ℝ \land z \in ℝ \land \|F (k)\| \in ℝ) \to ((\|F (k)\| < w \lor \|F (k)\| < z) \to \|F (k)\| < if (w \leq z, z, w))$
51	50	3expia	$⊢ (w \in ℝ \land z \in ℝ) \to (\|F (k)\| \in ℝ \to ((\|F (k)\| < w \lor \|F (k)\| < z) \to \|F (k)\| < if (w \leq z, z, w)))$
52	51	ralimdv	$⊢ (w \in ℝ \land z \in ℝ) \to (\forall k \in Z \|F (k)\| \in ℝ \to \forall k \in Z ((\|F (k)\| < w \lor \|F (k)\| < z) \to \|F (k)\| < if (w \leq z, z, w)))$
53		ralim	$⊢ \forall k \in Z ((\|F (k)\| < w \lor \|F (k)\| < z) \to \|F (k)\| < if (w \leq z, z, w)) \to (\forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \to \forall k \in Z \|F (k)\| < if (w \leq z, z, w))$
54	52 53	syl6	$⊢ (w \in ℝ \land z \in ℝ) \to (\forall k \in Z \|F (k)\| \in ℝ \to (\forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \to \forall k \in Z \|F (k)\| < if (w \leq z, z, w)))$
55		brralrspcev	$⊢ (if (w \leq z, z, w) \in ℝ \land \forall k \in Z \|F (k)\| < if (w \leq z, z, w)) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y$
56	55	ex	$⊢ if (w \leq z, z, w) \in ℝ \to (\forall k \in Z \|F (k)\| < if (w \leq z, z, w) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)$
57	39 56	syl	$⊢ (w \in ℝ \land z \in ℝ) \to (\forall k \in Z \|F (k)\| < if (w \leq z, z, w) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)$
58	54 57	syl6d	$⊢ (w \in ℝ \land z \in ℝ) \to (\forall k \in Z \|F (k)\| \in ℝ \to (\forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))$
59		uzssz	$⊢ ℤ_{\geq M} \subseteq ℤ$
60	1 59	eqsstri	$⊢ Z \subseteq ℤ$
61	60	sseli	$⊢ k \in Z \to k \in ℤ$
62	60	sseli	$⊢ j \in Z \to j \in ℤ$
63		uztric	$⊢ (k \in ℤ \land j \in ℤ) \to (j \in ℤ_{\geq k} \lor k \in ℤ_{\geq j})$
64	61 62 63	syl2anr	$⊢ (j \in Z \land k \in Z) \to (j \in ℤ_{\geq k} \lor k \in ℤ_{\geq j})$
65		simpr	$⊢ (j \in Z \land k \in Z) \to k \in Z$
66	65 1	eleqtrdi	$⊢ (j \in Z \land k \in Z) \to k \in ℤ_{\geq M}$
67		elfzuzb	$⊢ k \in (M \dots j) \leftrightarrow (k \in ℤ_{\geq M} \land j \in ℤ_{\geq k})$
68	67	baib	$⊢ k \in ℤ_{\geq M} \to (k \in (M \dots j) \leftrightarrow j \in ℤ_{\geq k})$
69	66 68	syl	$⊢ (j \in Z \land k \in Z) \to (k \in (M \dots j) \leftrightarrow j \in ℤ_{\geq k})$
70	69	orbi1d	$⊢ (j \in Z \land k \in Z) \to ((k \in (M \dots j) \lor k \in ℤ_{\geq j}) \leftrightarrow (j \in ℤ_{\geq k} \lor k \in ℤ_{\geq j}))$
71	64 70	mpbird	$⊢ (j \in Z \land k \in Z) \to (k \in (M \dots j) \lor k \in ℤ_{\geq j})$
72	71	ex	$⊢ j \in Z \to (k \in Z \to (k \in (M \dots j) \lor k \in ℤ_{\geq j}))$
73		pm3.48	$⊢ ((k \in (M \dots j) \to \|F (k)\| < w) \land (k \in ℤ_{\geq j} \to \|F (k)\| < z)) \to ((k \in (M \dots j) \lor k \in ℤ_{\geq j}) \to (\|F (k)\| < w \lor \|F (k)\| < z))$
74	72 73	syl9	$⊢ j \in Z \to (((k \in (M \dots j) \to \|F (k)\| < w) \land (k \in ℤ_{\geq j} \to \|F (k)\| < z)) \to (k \in Z \to (\|F (k)\| < w \lor \|F (k)\| < z)))$
75	74	alimdv	$⊢ j \in Z \to (\forall k ((k \in (M \dots j) \to \|F (k)\| < w) \land (k \in ℤ_{\geq j} \to \|F (k)\| < z)) \to \forall k (k \in Z \to (\|F (k)\| < w \lor \|F (k)\| < z)))$
76		df-ral	$⊢ \forall k \in (M \dots j) \|F (k)\| < w \leftrightarrow \forall k (k \in (M \dots j) \to \|F (k)\| < w)$
77		df-ral	$⊢ \forall k \in ℤ_{\geq j} \|F (k)\| < z \leftrightarrow \forall k (k \in ℤ_{\geq j} \to \|F (k)\| < z)$
78	76 77	anbi12i	$⊢ (\forall k \in (M \dots j) \|F (k)\| < w \land \forall k \in ℤ_{\geq j} \|F (k)\| < z) \leftrightarrow (\forall k (k \in (M \dots j) \to \|F (k)\| < w) \land \forall k (k \in ℤ_{\geq j} \to \|F (k)\| < z))$
79		19.26	$⊢ \forall k ((k \in (M \dots j) \to \|F (k)\| < w) \land (k \in ℤ_{\geq j} \to \|F (k)\| < z)) \leftrightarrow (\forall k (k \in (M \dots j) \to \|F (k)\| < w) \land \forall k (k \in ℤ_{\geq j} \to \|F (k)\| < z))$
80	78 79	bitr4i	$⊢ (\forall k \in (M \dots j) \|F (k)\| < w \land \forall k \in ℤ_{\geq j} \|F (k)\| < z) \leftrightarrow \forall k ((k \in (M \dots j) \to \|F (k)\| < w) \land (k \in ℤ_{\geq j} \to \|F (k)\| < z))$
81		df-ral	$⊢ \forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \leftrightarrow \forall k (k \in Z \to (\|F (k)\| < w \lor \|F (k)\| < z))$
82	75 80 81	3imtr4g	$⊢ j \in Z \to ((\forall k \in (M \dots j) \|F (k)\| < w \land \forall k \in ℤ_{\geq j} \|F (k)\| < z) \to \forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z))$
83	82	3impib	$⊢ (j \in Z \land \forall k \in (M \dots j) \|F (k)\| < w \land \forall k \in ℤ_{\geq j} \|F (k)\| < z) \to \forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z)$
84	83	imim1i	$⊢ (\forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y) \to ((j \in Z \land \forall k \in (M \dots j) \|F (k)\| < w \land \forall k \in ℤ_{\geq j} \|F (k)\| < z) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)$
85	84	3expd	$⊢ (\forall k \in Z (\|F (k)\| < w \lor \|F (k)\| < z) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y) \to (j \in Z \to (\forall k \in (M \dots j) \|F (k)\| < w \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)))$
86	58 85	syl6	$⊢ (w \in ℝ \land z \in ℝ) \to (\forall k \in Z \|F (k)\| \in ℝ \to (j \in Z \to (\forall k \in (M \dots j) \|F (k)\| < w \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))))$
87	86	com23	$⊢ (w \in ℝ \land z \in ℝ) \to (j \in Z \to (\forall k \in Z \|F (k)\| \in ℝ \to (\forall k \in (M \dots j) \|F (k)\| < w \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))))$
88	87	expimpd	$⊢ w \in ℝ \to ((z \in ℝ \land j \in Z) \to (\forall k \in Z \|F (k)\| \in ℝ \to (\forall k \in (M \dots j) \|F (k)\| < w \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))))$
89	88	com3r	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to (w \in ℝ \to ((z \in ℝ \land j \in Z) \to (\forall k \in (M \dots j) \|F (k)\| < w \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))))$
90	89	com34	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to (w \in ℝ \to (\forall k \in (M \dots j) \|F (k)\| < w \to ((z \in ℝ \land j \in Z) \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))))$
91	90	rexlimdv	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to (\exists w \in ℝ \forall k \in (M \dots j) \|F (k)\| < w \to ((z \in ℝ \land j \in Z) \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)))$
92	33 91	mpd	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to ((z \in ℝ \land j \in Z) \to (\forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y))$
93	92	rexlimdvv	$⊢ \forall k \in Z \|F (k)\| \in ℝ \to (\exists z \in ℝ \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k)\| < z \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)$
94	3 8 93	sylsyld	$⊢ \forall k \in Z F (k) \in ℂ \to (\forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y)$
95	94	imp	$⊢ (\forall k \in Z F (k) \in ℂ \land \forall x \in ℝ^{+} \exists j \in Z \forall k \in ℤ_{\geq j} \|F (k) - F (j)\| < x) \to \exists y \in ℝ \forall k \in Z \|F (k)\| < y$

Metamath Proof Explorer

Theorem caubnd

Proof