cvsdiv

Description: Division of the scalar ring of a subcomplex vector space. (Contributed by Thierry Arnoux, 22-May-2019)

	Ref	Expression
Hypotheses	cvsdiv.f	$⊢ F = Scalar (W)$
	cvsdiv.k	$⊢ K = {Base}_{F}$
Assertion	cvsdiv	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to \frac{A}{B} = A /_{r} (F) B$

Proof

Step	Hyp	Ref	Expression
1		cvsdiv.f	$⊢ F = Scalar (W)$
2		cvsdiv.k	$⊢ K = {Base}_{F}$
3		simpl	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to W \in ℂVec$
4	3	cvsclm	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to W \in CMod$
5	1 2	clmsubrg	$⊢ W \in CMod \to K \in SubRing (ℂ_{fld})$
6	4 5	syl	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to K \in SubRing (ℂ_{fld})$
7		simpr1	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to A \in K$
8		simpr2	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to B \in K$
9		simpr3	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to B \neq 0$
10		eldifsn	$⊢ B \in (K ∖ \{0\}) \leftrightarrow (B \in K \land B \neq 0)$
11	8 9 10	sylanbrc	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to B \in (K ∖ \{0\})$
12	1 2	cvsunit	$⊢ W \in ℂVec \to K ∖ \{0\} = Unit (F)$
13	3 12	syl	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to K ∖ \{0\} = Unit (F)$
14	1 2	clmsca	$⊢ W \in CMod \to F = ℂ_{fld} ↾_{𝑠} K$
15	4 14	syl	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to F = ℂ_{fld} ↾_{𝑠} K$
16	15	fveq2d	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to Unit (F) = Unit (ℂ_{fld} ↾_{𝑠} K)$
17	13 16	eqtrd	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to K ∖ \{0\} = Unit (ℂ_{fld} ↾_{𝑠} K)$
18	11 17	eleqtrd	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to B \in Unit (ℂ_{fld} ↾_{𝑠} K)$
19		eqid	$⊢ ℂ_{fld} ↾_{𝑠} K = ℂ_{fld} ↾_{𝑠} K$
20		cnflddiv	$⊢ \div = /_{r} (ℂ_{fld})$
21		eqid	$⊢ Unit (ℂ_{fld} ↾_{𝑠} K) = Unit (ℂ_{fld} ↾_{𝑠} K)$
22		eqid	$⊢ /_{r} (ℂ_{fld} ↾_{𝑠} K) = /_{r} (ℂ_{fld} ↾_{𝑠} K)$
23	19 20 21 22	subrgdv	$⊢ (K \in SubRing (ℂ_{fld}) \land A \in K \land B \in Unit (ℂ_{fld} ↾_{𝑠} K)) \to \frac{A}{B} = A /_{r} (ℂ_{fld} ↾_{𝑠} K) B$
24	6 7 18 23	syl3anc	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to \frac{A}{B} = A /_{r} (ℂ_{fld} ↾_{𝑠} K) B$
25	15	fveq2d	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to /_{r} (F) = /_{r} (ℂ_{fld} ↾_{𝑠} K)$
26	25	oveqd	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to A /_{r} (F) B = A /_{r} (ℂ_{fld} ↾_{𝑠} K) B$
27	24 26	eqtr4d	$⊢ (W \in ℂVec \land (A \in K \land B \in K \land B \neq 0)) \to \frac{A}{B} = A /_{r} (F) B$

Metamath Proof Explorer

Theorem cvsdiv

Proof