dchrisum0flb

Description: The divisor sum of a real Dirichlet character, is lower bounded by zero everywhere and one at the squares. Equation 9.4.29 of Shapiro, p. 382. (Contributed by Mario Carneiro, 5-May-2016)

	Ref	Expression
Hypotheses	rpvmasum.z	$⊢ Z = ℤ / N ℤ$
	rpvmasum.l	$⊢ L = ℤRHom (Z)$
	rpvmasum.a	$⊢ φ \to N \in ℕ$
	rpvmasum2.g	$⊢ G = DChr (N)$
	rpvmasum2.d	$⊢ D = {Base}_{G}$
	rpvmasum2.1	$⊢ \underset{˙}{1} = 0_{G}$
	dchrisum0f.f	$⊢ F = (b \in ℕ ⟼ \sum_{v \in \{q \in ℕ \| q ∥ b\}} X (L (v)))$
	dchrisum0f.x	$⊢ φ \to X \in D$
	dchrisum0flb.r	$⊢ φ \to X : {Base}_{Z} ⟶ ℝ$
	dchrisum0flb.a	$⊢ φ \to A \in ℕ$
Assertion	dchrisum0flb	$⊢ φ \to if (\sqrt{A} \in ℕ, 1, 0) \leq F (A)$

Proof

Step	Hyp	Ref	Expression
1		rpvmasum.z	$⊢ Z = ℤ / N ℤ$
2		rpvmasum.l	$⊢ L = ℤRHom (Z)$
3		rpvmasum.a	$⊢ φ \to N \in ℕ$
4		rpvmasum2.g	$⊢ G = DChr (N)$
5		rpvmasum2.d	$⊢ D = {Base}_{G}$
6		rpvmasum2.1	$⊢ \underset{˙}{1} = 0_{G}$
7		dchrisum0f.f	$⊢ F = (b \in ℕ ⟼ \sum_{v \in \{q \in ℕ \| q ∥ b\}} X (L (v)))$
8		dchrisum0f.x	$⊢ φ \to X \in D$
9		dchrisum0flb.r	$⊢ φ \to X : {Base}_{Z} ⟶ ℝ$
10		dchrisum0flb.a	$⊢ φ \to A \in ℕ$
11		fveq2	$⊢ y = A \to \sqrt{y} = \sqrt{A}$
12	11	eleq1d	$⊢ y = A \to (\sqrt{y} \in ℕ \leftrightarrow \sqrt{A} \in ℕ)$
13	12	ifbid	$⊢ y = A \to if (\sqrt{y} \in ℕ, 1, 0) = if (\sqrt{A} \in ℕ, 1, 0)$
14		fveq2	$⊢ y = A \to F (y) = F (A)$
15	13 14	breq12d	$⊢ y = A \to (if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow if (\sqrt{A} \in ℕ, 1, 0) \leq F (A))$
16		oveq2	$⊢ k = 1 \to (1 \dots k) = (1 \dots 1)$
17	16	raleqdv	$⊢ k = 1 \to (\forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in (1 \dots 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
18	17	imbi2d	$⊢ k = 1 \to ((φ \to \forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)) \leftrightarrow (φ \to \forall y \in (1 \dots 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
19		oveq2	$⊢ k = i \to (1 \dots k) = (1 \dots i)$
20	19	raleqdv	$⊢ k = i \to (\forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
21	20	imbi2d	$⊢ k = i \to ((φ \to \forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)) \leftrightarrow (φ \to \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
22		oveq2	$⊢ k = i + 1 \to (1 \dots k) = (1 \dots i + 1)$
23	22	raleqdv	$⊢ k = i + 1 \to (\forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
24	23	imbi2d	$⊢ k = i + 1 \to ((φ \to \forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)) \leftrightarrow (φ \to \forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
25		oveq2	$⊢ k = A \to (1 \dots k) = (1 \dots A)$
26	25	raleqdv	$⊢ k = A \to (\forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in (1 \dots A) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
27	26	imbi2d	$⊢ k = A \to ((φ \to \forall y \in (1 \dots k) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)) \leftrightarrow (φ \to \forall y \in (1 \dots A) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
28		2prm	$⊢ 2 \in ℙ$
29	28	a1i	$⊢ φ \to 2 \in ℙ$
30		0nn0	$⊢ 0 \in ℕ_{0}$
31	30	a1i	$⊢ φ \to 0 \in ℕ_{0}$
32	1 2 3 4 5 6 7 8 9 29 31	dchrisum0flblem1	$⊢ φ \to if (\sqrt{2^{0}} \in ℕ, 1, 0) \leq F (2^{0})$
33		elfz1eq	$⊢ y \in (1 \dots 1) \to y = 1$
34		2nn0	$⊢ 2 \in ℕ_{0}$
35	34	numexp0	$⊢ 2^{0} = 1$
36	33 35	eqtr4di	$⊢ y \in (1 \dots 1) \to y = 2^{0}$
37	36	fveq2d	$⊢ y \in (1 \dots 1) \to \sqrt{y} = \sqrt{2^{0}}$
38	37	eleq1d	$⊢ y \in (1 \dots 1) \to (\sqrt{y} \in ℕ \leftrightarrow \sqrt{2^{0}} \in ℕ)$
39	38	ifbid	$⊢ y \in (1 \dots 1) \to if (\sqrt{y} \in ℕ, 1, 0) = if (\sqrt{2^{0}} \in ℕ, 1, 0)$
40	36	fveq2d	$⊢ y \in (1 \dots 1) \to F (y) = F (2^{0})$
41	39 40	breq12d	$⊢ y \in (1 \dots 1) \to (if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow if (\sqrt{2^{0}} \in ℕ, 1, 0) \leq F (2^{0}))$
42	41	biimprcd	$⊢ if (\sqrt{2^{0}} \in ℕ, 1, 0) \leq F (2^{0}) \to (y \in (1 \dots 1) \to if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
43	42	ralrimiv	$⊢ if (\sqrt{2^{0}} \in ℕ, 1, 0) \leq F (2^{0}) \to \forall y \in (1 \dots 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
44	32 43	syl	$⊢ φ \to \forall y \in (1 \dots 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
45		simpr	$⊢ (φ \land i \in ℕ) \to i \in ℕ$
46		nnuz	$⊢ ℕ = ℤ_{\geq 1}$
47	45 46	eleqtrdi	$⊢ (φ \land i \in ℕ) \to i \in ℤ_{\geq 1}$
48	47	adantrr	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to i \in ℤ_{\geq 1}$
49		eluzp1p1	$⊢ i \in ℤ_{\geq 1} \to i + 1 \in ℤ_{\geq (1 + 1)}$
50	48 49	syl	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to i + 1 \in ℤ_{\geq (1 + 1)}$
51		df-2	$⊢ 2 = 1 + 1$
52	51	fveq2i	$⊢ ℤ_{\geq 2} = ℤ_{\geq (1 + 1)}$
53	50 52	eleqtrrdi	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to i + 1 \in ℤ_{\geq 2}$
54		exprmfct	$⊢ i + 1 \in ℤ_{\geq 2} \to \exists p \in ℙ p ∥ (i + 1)$
55	53 54	syl	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to \exists p \in ℙ p ∥ (i + 1)$
56	3	ad2antrr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to N \in ℕ$
57	8	ad2antrr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to X \in D$
58	9	ad2antrr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to X : {Base}_{Z} ⟶ ℝ$
59	53	adantr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to i + 1 \in ℤ_{\geq 2}$
60		simprl	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to p \in ℙ$
61		simprr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to p ∥ (i + 1)$
62		simplrr	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
63		simplrl	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to i \in ℕ$
64	63	nnzd	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to i \in ℤ$
65		fzval3	$⊢ i \in ℤ \to (1 \dots i) = (1 ..^i + 1)$
66	64 65	syl	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to (1 \dots i) = (1 ..^i + 1)$
67	66	raleqdv	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in (1 ..^i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
68	62 67	mpbid	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to \forall y \in (1 ..^i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
69	1 2 56 4 5 6 7 57 58 59 60 61 68	dchrisum0flblem2	$⊢ ((φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \land (p \in ℙ \land p ∥ (i + 1))) \to if (\sqrt{i + 1} \in ℕ, 1, 0) \leq F (i + 1)$
70	55 69	rexlimddv	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to if (\sqrt{i + 1} \in ℕ, 1, 0) \leq F (i + 1)$
71		ovex	$⊢ i + 1 \in V$
72		fveq2	$⊢ y = i + 1 \to \sqrt{y} = \sqrt{i + 1}$
73	72	eleq1d	$⊢ y = i + 1 \to (\sqrt{y} \in ℕ \leftrightarrow \sqrt{i + 1} \in ℕ)$
74	73	ifbid	$⊢ y = i + 1 \to if (\sqrt{y} \in ℕ, 1, 0) = if (\sqrt{i + 1} \in ℕ, 1, 0)$
75		fveq2	$⊢ y = i + 1 \to F (y) = F (i + 1)$
76	74 75	breq12d	$⊢ y = i + 1 \to (if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow if (\sqrt{i + 1} \in ℕ, 1, 0) \leq F (i + 1))$
77	71 76	ralsn	$⊢ \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow if (\sqrt{i + 1} \in ℕ, 1, 0) \leq F (i + 1)$
78	70 77	sylibr	$⊢ (φ \land (i \in ℕ \land \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))) \to \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
79	78	expr	$⊢ (φ \land i \in ℕ) \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \to \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
80	79	ancld	$⊢ (φ \land i \in ℕ) \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \land \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
81		fzsuc	$⊢ i \in ℤ_{\geq 1} \to (1 \dots i + 1) = (1 \dots i) \cup \{i + 1\}$
82	47 81	syl	$⊢ (φ \land i \in ℕ) \to (1 \dots i + 1) = (1 \dots i) \cup \{i + 1\}$
83	82	raleqdv	$⊢ (φ \land i \in ℕ) \to (\forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow \forall y \in ((1 \dots i) \cup \{i + 1\}) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
84		ralunb	$⊢ \forall y \in ((1 \dots i) \cup \{i + 1\}) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \land \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
85	83 84	bitrdi	$⊢ (φ \land i \in ℕ) \to (\forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \leftrightarrow (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \land \forall y \in \{i + 1\} if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
86	80 85	sylibrd	$⊢ (φ \land i \in ℕ) \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \to \forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
87	86	expcom	$⊢ i \in ℕ \to (φ \to (\forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y) \to \forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
88	87	a2d	$⊢ i \in ℕ \to ((φ \to \forall y \in (1 \dots i) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)) \to (φ \to \forall y \in (1 \dots i + 1) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)))$
89	18 21 24 27 44 88	nnind	$⊢ A \in ℕ \to (φ \to \forall y \in (1 \dots A) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y))$
90	10 89	mpcom	$⊢ φ \to \forall y \in (1 \dots A) if (\sqrt{y} \in ℕ, 1, 0) \leq F (y)$
91	10 46	eleqtrdi	$⊢ φ \to A \in ℤ_{\geq 1}$
92		eluzfz2	$⊢ A \in ℤ_{\geq 1} \to A \in (1 \dots A)$
93	91 92	syl	$⊢ φ \to A \in (1 \dots A)$
94	15 90 93	rspcdva	$⊢ φ \to if (\sqrt{A} \in ℕ, 1, 0) \leq F (A)$

Metamath Proof Explorer

Theorem dchrisum0flb

Proof