vdwnnlem2

Description: Lemma for vdwnn . The set of all "bad" k for the theorem is upwards-closed, because a long AP implies a short AP. (Contributed by Mario Carneiro, 13-Sep-2014)

	Ref	Expression
Hypotheses	vdwnn.1	$⊢ φ \to R \in Fin$
	vdwnn.2	$⊢ φ \to F : ℕ ⟶ R$
	vdwnn.3	$⊢ S = \{k \in ℕ \| \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}]\}$
Assertion	vdwnnlem2	$⊢ (φ \land B \in ℤ_{\geq A}) \to (A \in S \to B \in S)$

Proof

Step	Hyp	Ref	Expression
1		vdwnn.1	$⊢ φ \to R \in Fin$
2		vdwnn.2	$⊢ φ \to F : ℕ ⟶ R$
3		vdwnn.3	$⊢ S = \{k \in ℕ \| \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}]\}$
4		eluzel2	$⊢ B \in ℤ_{\geq A} \to A \in ℤ$
5		peano2zm	$⊢ A \in ℤ \to A - 1 \in ℤ$
6	4 5	syl	$⊢ B \in ℤ_{\geq A} \to A - 1 \in ℤ$
7		id	$⊢ B \in ℤ_{\geq A} \to B \in ℤ_{\geq A}$
8	4	zcnd	$⊢ B \in ℤ_{\geq A} \to A \in ℂ$
9		ax-1cn	$⊢ 1 \in ℂ$
10		npcan	$⊢ (A \in ℂ \land 1 \in ℂ) \to A - 1 + 1 = A$
11	8 9 10	sylancl	$⊢ B \in ℤ_{\geq A} \to A - 1 + 1 = A$
12	11	fveq2d	$⊢ B \in ℤ_{\geq A} \to ℤ_{\geq (A - 1 + 1)} = ℤ_{\geq A}$
13	7 12	eleqtrrd	$⊢ B \in ℤ_{\geq A} \to B \in ℤ_{\geq (A - 1 + 1)}$
14		eluzp1m1	$⊢ (A - 1 \in ℤ \land B \in ℤ_{\geq (A - 1 + 1)}) \to B - 1 \in ℤ_{\geq (A - 1)}$
15	6 13 14	syl2anc	$⊢ B \in ℤ_{\geq A} \to B - 1 \in ℤ_{\geq (A - 1)}$
16	15	ad2antlr	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to B - 1 \in ℤ_{\geq (A - 1)}$
17		fzss2	$⊢ B - 1 \in ℤ_{\geq (A - 1)} \to (0 \dots A - 1) \subseteq (0 \dots B - 1)$
18		ssralv	$⊢ (0 \dots A - 1) \subseteq (0 \dots B - 1) \to (\forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}] \to \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
19	16 17 18	3syl	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to (\forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}] \to \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
20	19	reximdv	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to (\exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}] \to \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
21	20	reximdv	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to (\exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}] \to \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
22	21	con3d	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to (\neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}] \to \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}])$
23		id	$⊢ A \in ℕ \to A \in ℕ$
24		simpr	$⊢ (φ \land B \in ℤ_{\geq A}) \to B \in ℤ_{\geq A}$
25		eluznn	$⊢ (A \in ℕ \land B \in ℤ_{\geq A}) \to B \in ℕ$
26	23 24 25	syl2anr	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to B \in ℕ$
27	22 26	jctild	$⊢ ((φ \land B \in ℤ_{\geq A}) \land A \in ℕ) \to (\neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}] \to (B \in ℕ \land \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}]))$
28	27	expimpd	$⊢ (φ \land B \in ℤ_{\geq A}) \to ((A \in ℕ \land \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}]) \to (B \in ℕ \land \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}]))$
29		oveq1	$⊢ k = A \to k - 1 = A - 1$
30	29	oveq2d	$⊢ k = A \to (0 \dots k - 1) = (0 \dots A - 1)$
31	30	raleqdv	$⊢ k = A \to (\forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
32	31	2rexbidv	$⊢ k = A \to (\exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
33	32	notbid	$⊢ k = A \to (\neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
34	33 3	elrab2	$⊢ A \in S \leftrightarrow (A \in ℕ \land \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots A - 1) a + m d \in F^{-1} [\{c\}])$
35		oveq1	$⊢ k = B \to k - 1 = B - 1$
36	35	oveq2d	$⊢ k = B \to (0 \dots k - 1) = (0 \dots B - 1)$
37	36	raleqdv	$⊢ k = B \to (\forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}])$
38	37	2rexbidv	$⊢ k = B \to (\exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}])$
39	38	notbid	$⊢ k = B \to (\neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots k - 1) a + m d \in F^{-1} [\{c\}] \leftrightarrow \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}])$
40	39 3	elrab2	$⊢ B \in S \leftrightarrow (B \in ℕ \land \neg \exists a \in ℕ \exists d \in ℕ \forall m \in (0 \dots B - 1) a + m d \in F^{-1} [\{c\}])$
41	28 34 40	3imtr4g	$⊢ (φ \land B \in ℤ_{\geq A}) \to (A \in S \to B \in S)$

Metamath Proof Explorer

Theorem vdwnnlem2

Proof