Metamath Proof Explorer

Theorem adjeq0

Description: An operator is zero iff its adjoint is zero. Theorem 3.11(i) of Beran p. 106. (Contributed by NM, 20-Feb-2006) (New usage is discouraged.)

		Ref	Expression
	Assertion	adjeq0	$⊢ T = 0_{hop} \leftrightarrow {adj}_{h} (T) = 0_{hop}$

Proof

Step	Hyp	Ref	Expression
1		fveq2	$⊢ T = 0_{hop} \to {adj}_{h} (T) = {adj}_{h} (0_{hop})$
2		adj0	$⊢ {adj}_{h} (0_{hop}) = 0_{hop}$
3	1 2	eqtrdi	$⊢ T = 0_{hop} \to {adj}_{h} (T) = 0_{hop}$
4		fveq2	$⊢ {adj}_{h} (T) = 0_{hop} \to {adj}_{h} ({adj}_{h} (T)) = {adj}_{h} (0_{hop})$
5		bdopssadj	$⊢ BndLinOp \subseteq dom {adj}_{h}$
6		0bdop	$⊢ 0_{hop} \in BndLinOp$
7	5 6	sselii	$⊢ 0_{hop} \in dom {adj}_{h}$
8		eleq1	$⊢ {adj}_{h} (T) = 0_{hop} \to ({adj}_{h} (T) \in dom {adj}_{h} \leftrightarrow 0_{hop} \in dom {adj}_{h})$
9	7 8	mpbiri	$⊢ {adj}_{h} (T) = 0_{hop} \to {adj}_{h} (T) \in dom {adj}_{h}$
10		dmadjrnb	$⊢ T \in dom {adj}_{h} \leftrightarrow {adj}_{h} (T) \in dom {adj}_{h}$
11	9 10	sylibr	$⊢ {adj}_{h} (T) = 0_{hop} \to T \in dom {adj}_{h}$
12		adjadj	$⊢ T \in dom {adj}_{h} \to {adj}_{h} ({adj}_{h} (T)) = T$
13	11 12	syl	$⊢ {adj}_{h} (T) = 0_{hop} \to {adj}_{h} ({adj}_{h} (T)) = T$
14	2	a1i	$⊢ {adj}_{h} (T) = 0_{hop} \to {adj}_{h} (0_{hop}) = 0_{hop}$
15	4 13 14	3eqtr3d	$⊢ {adj}_{h} (T) = 0_{hop} \to T = 0_{hop}$
16	3 15	impbii	$⊢ T = 0_{hop} \leftrightarrow {adj}_{h} (T) = 0_{hop}$