Metamath Proof Explorer

Theorem normlem5

Description: Lemma used to derive properties of norm. Part of Theorem 3.3(ii) of Beran p. 97. (Contributed by NM, 10-Aug-1999) (New usage is discouraged.)

		Ref	Expression
	Hypotheses	normlem1.1	$⊢ S \in ℂ$
		normlem1.2	$⊢ F \in ℋ$
		normlem1.3	$⊢ G \in ℋ$
		normlem2.4	$⊢ B = - (\overline{S} (F \cdot_{ih} G) + S (G \cdot_{ih} F))$
		normlem3.5	$⊢ A = G \cdot_{ih} G$
		normlem3.6	$⊢ C = F \cdot_{ih} F$
		normlem4.7	$⊢ R \in ℝ$
		normlem4.8	$⊢ \|S\| = 1$
	Assertion	normlem5	$⊢ 0 \leq A R^{2} + B R + C$

Proof

Step	Hyp	Ref	Expression
1		normlem1.1	$⊢ S \in ℂ$
2		normlem1.2	$⊢ F \in ℋ$
3		normlem1.3	$⊢ G \in ℋ$
4		normlem2.4	$⊢ B = - (\overline{S} (F \cdot_{ih} G) + S (G \cdot_{ih} F))$
5		normlem3.5	$⊢ A = G \cdot_{ih} G$
6		normlem3.6	$⊢ C = F \cdot_{ih} F$
7		normlem4.7	$⊢ R \in ℝ$
8		normlem4.8	$⊢ \|S\| = 1$
9	7	recni	$⊢ R \in ℂ$
10	1 9	mulcli	$⊢ S R \in ℂ$
11	10 3	hvmulcli	$⊢ S R \cdot_{ℎ} G \in ℋ$
12	2 11	hvsubcli	$⊢ F -_{ℎ} (S R \cdot_{ℎ} G) \in ℋ$
13		hiidge0	$⊢ F -_{ℎ} (S R \cdot_{ℎ} G) \in ℋ \to 0 \leq (F -_{ℎ} (S R \cdot_{ℎ} G)) \cdot_{ih} (F -_{ℎ} (S R \cdot_{ℎ} G))$
14	12 13	ax-mp	$⊢ 0 \leq (F -_{ℎ} (S R \cdot_{ℎ} G)) \cdot_{ih} (F -_{ℎ} (S R \cdot_{ℎ} G))$
15	1 2 3 4 5 6 7 8	normlem4	$⊢ (F -_{ℎ} (S R \cdot_{ℎ} G)) \cdot_{ih} (F -_{ℎ} (S R \cdot_{ℎ} G)) = A R^{2} + B R + C$
16	14 15	breqtri	$⊢ 0 \leq A R^{2} + B R + C$