pjjsi

Description: A sufficient condition for subspace join to be equal to subspace sum. (Contributed by NM, 29-May-2004) (New usage is discouraged.)

	Ref	Expression
Hypotheses	pjjs.1	$⊢ G \in C_{ℋ}$
	pjjs.2	$⊢ H \in S_{ℋ}$
Assertion	pjjsi	$⊢ \forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to G \lor_{ℋ} H = G +_{ℋ} H$

Proof

Step	Hyp	Ref	Expression
1		pjjs.1	$⊢ G \in C_{ℋ}$
2		pjjs.2	$⊢ H \in S_{ℋ}$
3		fveq2	$⊢ x = w \to {proj}_{ℎ} (⊥ (G)) (x) = {proj}_{ℎ} (⊥ (G)) (w)$
4	3	eleq1d	$⊢ x = w \to ({proj}_{ℎ} (⊥ (G)) (x) \in H \leftrightarrow {proj}_{ℎ} (⊥ (G)) (w) \in H)$
5	4	rspcv	$⊢ w \in (G \lor_{ℋ} H) \to (\forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to {proj}_{ℎ} (⊥ (G)) (w) \in H)$
6	1	chshii	$⊢ G \in S_{ℋ}$
7	6 2	shjcli	$⊢ G \lor_{ℋ} H \in C_{ℋ}$
8	7	cheli	$⊢ w \in (G \lor_{ℋ} H) \to w \in ℋ$
9	1	pjcli	$⊢ w \in ℋ \to {proj}_{ℎ} (G) (w) \in G$
10	9	anim1i	$⊢ (w \in ℋ \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to ({proj}_{ℎ} (G) (w) \in G \land {proj}_{ℎ} (⊥ (G)) (w) \in H)$
11		axpjpj	$⊢ (G \in C_{ℋ} \land w \in ℋ) \to w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w)$
12	1 11	mpan	$⊢ w \in ℋ \to w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w)$
13	12	adantr	$⊢ (w \in ℋ \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w)$
14	10 13	jca	$⊢ (w \in ℋ \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to (({proj}_{ℎ} (G) (w) \in G \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \land w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w))$
15	8 14	sylan	$⊢ (w \in (G \lor_{ℋ} H) \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to (({proj}_{ℎ} (G) (w) \in G \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \land w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w))$
16		rspceov	$⊢ ({proj}_{ℎ} (G) (w) \in G \land {proj}_{ℎ} (⊥ (G)) (w) \in H \land w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w)) \to \exists y \in G \exists z \in H w = y +_{ℎ} z$
17	16	3expa	$⊢ (({proj}_{ℎ} (G) (w) \in G \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \land w = {proj}_{ℎ} (G) (w) +_{ℎ} {proj}_{ℎ} (⊥ (G)) (w)) \to \exists y \in G \exists z \in H w = y +_{ℎ} z$
18	15 17	syl	$⊢ (w \in (G \lor_{ℋ} H) \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to \exists y \in G \exists z \in H w = y +_{ℎ} z$
19	6 2	shseli	$⊢ w \in (G +_{ℋ} H) \leftrightarrow \exists y \in G \exists z \in H w = y +_{ℎ} z$
20	18 19	sylibr	$⊢ (w \in (G \lor_{ℋ} H) \land {proj}_{ℎ} (⊥ (G)) (w) \in H) \to w \in (G +_{ℋ} H)$
21	20	ex	$⊢ w \in (G \lor_{ℋ} H) \to ({proj}_{ℎ} (⊥ (G)) (w) \in H \to w \in (G +_{ℋ} H))$
22	5 21	syldc	$⊢ \forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to (w \in (G \lor_{ℋ} H) \to w \in (G +_{ℋ} H))$
23	22	ssrdv	$⊢ \forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to G \lor_{ℋ} H \subseteq G +_{ℋ} H$
24	6 2	shsleji	$⊢ G +_{ℋ} H \subseteq G \lor_{ℋ} H$
25	23 24	jctir	$⊢ \forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to (G \lor_{ℋ} H \subseteq G +_{ℋ} H \land G +_{ℋ} H \subseteq G \lor_{ℋ} H)$
26		eqss	$⊢ G \lor_{ℋ} H = G +_{ℋ} H \leftrightarrow (G \lor_{ℋ} H \subseteq G +_{ℋ} H \land G +_{ℋ} H \subseteq G \lor_{ℋ} H)$
27	25 26	sylibr	$⊢ \forall x \in (G \lor_{ℋ} H) {proj}_{ℎ} (⊥ (G)) (x) \in H \to G \lor_{ℋ} H = G +_{ℋ} H$

Metamath Proof Explorer

Theorem pjjsi

Proof