tlmtgp

Description: A topological vector space is a topological group. (Contributed by Mario Carneiro, 5-Oct-2015)

		Ref	Expression
	Assertion	tlmtgp	$⊢ W \in TopMod \to W \in TopGrp$

Proof

Step	Hyp	Ref	Expression
1		tlmlmod	$⊢ W \in TopMod \to W \in LMod$
2		lmodgrp	$⊢ W \in LMod \to W \in Grp$
3	1 2	syl	$⊢ W \in TopMod \to W \in Grp$
4		tlmtmd	$⊢ W \in TopMod \to W \in TopMnd$
5		eqid	$⊢ {Base}_{W} = {Base}_{W}$
6		eqid	$⊢ {inv}_{g} (W) = {inv}_{g} (W)$
7	5 6	grpinvf	$⊢ W \in Grp \to {inv}_{g} (W) : {Base}_{W} ⟶ {Base}_{W}$
8	3 7	syl	$⊢ W \in TopMod \to {inv}_{g} (W) : {Base}_{W} ⟶ {Base}_{W}$
9	8	feqmptd	$⊢ W \in TopMod \to {inv}_{g} (W) = (x \in {Base}_{W} ⟼ {inv}_{g} (W) (x))$
10		eqid	$⊢ Scalar (W) = Scalar (W)$
11		eqid	$⊢ \cdot_{W} = \cdot_{W}$
12		eqid	$⊢ 1_{Scalar (W)} = 1_{Scalar (W)}$
13		eqid	$⊢ {inv}_{g} (Scalar (W)) = {inv}_{g} (Scalar (W))$
14	5 6 10 11 12 13	lmodvneg1	$⊢ (W \in LMod \land x \in {Base}_{W}) \to {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \cdot_{W} x = {inv}_{g} (W) (x)$
15	1 14	sylan	$⊢ (W \in TopMod \land x \in {Base}_{W}) \to {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \cdot_{W} x = {inv}_{g} (W) (x)$
16	15	mpteq2dva	$⊢ W \in TopMod \to (x \in {Base}_{W} ⟼ {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \cdot_{W} x) = (x \in {Base}_{W} ⟼ {inv}_{g} (W) (x))$
17	9 16	eqtr4d	$⊢ W \in TopMod \to {inv}_{g} (W) = (x \in {Base}_{W} ⟼ {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \cdot_{W} x)$
18		eqid	$⊢ TopOpen (W) = TopOpen (W)$
19		eqid	$⊢ TopOpen (Scalar (W)) = TopOpen (Scalar (W))$
20		id	$⊢ W \in TopMod \to W \in TopMod$
21		tlmtps	$⊢ W \in TopMod \to W \in TopSp$
22	5 18	istps	$⊢ W \in TopSp \leftrightarrow TopOpen (W) \in TopOn ({Base}_{W})$
23	21 22	sylib	$⊢ W \in TopMod \to TopOpen (W) \in TopOn ({Base}_{W})$
24	10	tlmscatps	$⊢ W \in TopMod \to Scalar (W) \in TopSp$
25		eqid	$⊢ {Base}_{Scalar (W)} = {Base}_{Scalar (W)}$
26	25 19	istps	$⊢ Scalar (W) \in TopSp \leftrightarrow TopOpen (Scalar (W)) \in TopOn ({Base}_{Scalar (W)})$
27	24 26	sylib	$⊢ W \in TopMod \to TopOpen (Scalar (W)) \in TopOn ({Base}_{Scalar (W)})$
28	10	lmodring	$⊢ W \in LMod \to Scalar (W) \in Ring$
29	1 28	syl	$⊢ W \in TopMod \to Scalar (W) \in Ring$
30		ringgrp	$⊢ Scalar (W) \in Ring \to Scalar (W) \in Grp$
31	29 30	syl	$⊢ W \in TopMod \to Scalar (W) \in Grp$
32	25 12	ringidcl	$⊢ Scalar (W) \in Ring \to 1_{Scalar (W)} \in {Base}_{Scalar (W)}$
33	29 32	syl	$⊢ W \in TopMod \to 1_{Scalar (W)} \in {Base}_{Scalar (W)}$
34	25 13	grpinvcl	$⊢ (Scalar (W) \in Grp \land 1_{Scalar (W)} \in {Base}_{Scalar (W)}) \to {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \in {Base}_{Scalar (W)}$
35	31 33 34	syl2anc	$⊢ W \in TopMod \to {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \in {Base}_{Scalar (W)}$
36	23 27 35	cnmptc	$⊢ W \in TopMod \to (x \in {Base}_{W} ⟼ {inv}_{g} (Scalar (W)) (1_{Scalar (W)})) \in (TopOpen (W) Cn TopOpen (Scalar (W)))$
37	23	cnmptid	$⊢ W \in TopMod \to (x \in {Base}_{W} ⟼ x) \in (TopOpen (W) Cn TopOpen (W))$
38	10 11 18 19 20 23 36 37	cnmpt1vsca	$⊢ W \in TopMod \to (x \in {Base}_{W} ⟼ {inv}_{g} (Scalar (W)) (1_{Scalar (W)}) \cdot_{W} x) \in (TopOpen (W) Cn TopOpen (W))$
39	17 38	eqeltrd	$⊢ W \in TopMod \to {inv}_{g} (W) \in (TopOpen (W) Cn TopOpen (W))$
40	18 6	istgp	$⊢ W \in TopGrp \leftrightarrow (W \in Grp \land W \in TopMnd \land {inv}_{g} (W) \in (TopOpen (W) Cn TopOpen (W)))$
41	3 4 39 40	syl3anbrc	$⊢ W \in TopMod \to W \in TopGrp$

Metamath Proof Explorer

Theorem tlmtgp

Proof