shlesb1i

Description: Hilbert lattice ordering in terms of subspace sum. (Contributed by NM, 23-Nov-2004) (New usage is discouraged.)

	Ref	Expression
Hypotheses	shlesb1.1	$⊢ A \in S_{ℋ}$
	shlesb1.2	$⊢ B \in S_{ℋ}$
Assertion	shlesb1i	$⊢ A \subseteq B \leftrightarrow A +_{ℋ} B = B$

Step	Hyp	Ref	Expression
1		shlesb1.1	$⊢ A \in S_{ℋ}$
2		shlesb1.2	$⊢ B \in S_{ℋ}$
3		ssid	$⊢ B \subseteq B$
4	3	biantrur	$⊢ A \subseteq B \leftrightarrow (B \subseteq B \land A \subseteq B)$
5	2 1 2	shslubi	$⊢ (B \subseteq B \land A \subseteq B) \leftrightarrow B +_{ℋ} A \subseteq B$
6	2 1	shsub2i	$⊢ B \subseteq A +_{ℋ} B$
7		eqss	$⊢ A +_{ℋ} B = B \leftrightarrow (A +_{ℋ} B \subseteq B \land B \subseteq A +_{ℋ} B)$
8	6 7	mpbiran2	$⊢ A +_{ℋ} B = B \leftrightarrow A +_{ℋ} B \subseteq B$
9	1 2	shscomi	$⊢ A +_{ℋ} B = B +_{ℋ} A$
10	9	sseq1i	$⊢ A +_{ℋ} B \subseteq B \leftrightarrow B +_{ℋ} A \subseteq B$
11	8 10	bitr2i	$⊢ B +_{ℋ} A \subseteq B \leftrightarrow A +_{ℋ} B = B$
12	4 5 11	3bitri	$⊢ A \subseteq B \leftrightarrow A +_{ℋ} B = B$

Metamath Proof Explorer