ringnegl

Description: Negation in a ring is the same as left multiplication by -1. ( rngonegmn1l analog.) (Contributed by Jeff Madsen, 19-Jun-2010) (Revised by Mario Carneiro, 2-Jul-2014)

	Ref	Expression
Hypotheses	ringnegl.b	$⊢ B = {Base}_{R}$
	ringnegl.t	$⊢ \underset{˙}{\cdot} = \cdot_{R}$
	ringnegl.u	$⊢ \underset{˙}{1} = 1_{R}$
	ringnegl.n	$⊢ N = {inv}_{g} (R)$
	ringnegl.r	$⊢ φ \to R \in Ring$
	ringnegl.x	$⊢ φ \to X \in B$
Assertion	ringnegl	$⊢ φ \to N (\underset{˙}{1}) \underset{˙}{\cdot} X = N (X)$

Proof

Step	Hyp	Ref	Expression
1		ringnegl.b	$⊢ B = {Base}_{R}$
2		ringnegl.t	$⊢ \underset{˙}{\cdot} = \cdot_{R}$
3		ringnegl.u	$⊢ \underset{˙}{1} = 1_{R}$
4		ringnegl.n	$⊢ N = {inv}_{g} (R)$
5		ringnegl.r	$⊢ φ \to R \in Ring$
6		ringnegl.x	$⊢ φ \to X \in B$
7	1 3	ringidcl	$⊢ R \in Ring \to \underset{˙}{1} \in B$
8	5 7	syl	$⊢ φ \to \underset{˙}{1} \in B$
9		ringgrp	$⊢ R \in Ring \to R \in Grp$
10	5 9	syl	$⊢ φ \to R \in Grp$
11	1 4	grpinvcl	$⊢ (R \in Grp \land \underset{˙}{1} \in B) \to N (\underset{˙}{1}) \in B$
12	10 8 11	syl2anc	$⊢ φ \to N (\underset{˙}{1}) \in B$
13		eqid	$⊢ +_{R} = +_{R}$
14	1 13 2	ringdir	$⊢ (R \in Ring \land (\underset{˙}{1} \in B \land N (\underset{˙}{1}) \in B \land X \in B)) \to (\underset{˙}{1} +_{R} N (\underset{˙}{1})) \underset{˙}{\cdot} X = (\underset{˙}{1} \underset{˙}{\cdot} X) +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X)$
15	5 8 12 6 14	syl13anc	$⊢ φ \to (\underset{˙}{1} +_{R} N (\underset{˙}{1})) \underset{˙}{\cdot} X = (\underset{˙}{1} \underset{˙}{\cdot} X) +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X)$
16		eqid	$⊢ 0_{R} = 0_{R}$
17	1 13 16 4	grprinv	$⊢ (R \in Grp \land \underset{˙}{1} \in B) \to \underset{˙}{1} +_{R} N (\underset{˙}{1}) = 0_{R}$
18	10 8 17	syl2anc	$⊢ φ \to \underset{˙}{1} +_{R} N (\underset{˙}{1}) = 0_{R}$
19	18	oveq1d	$⊢ φ \to (\underset{˙}{1} +_{R} N (\underset{˙}{1})) \underset{˙}{\cdot} X = 0_{R} \underset{˙}{\cdot} X$
20	1 2 16	ringlz	$⊢ (R \in Ring \land X \in B) \to 0_{R} \underset{˙}{\cdot} X = 0_{R}$
21	5 6 20	syl2anc	$⊢ φ \to 0_{R} \underset{˙}{\cdot} X = 0_{R}$
22	19 21	eqtrd	$⊢ φ \to (\underset{˙}{1} +_{R} N (\underset{˙}{1})) \underset{˙}{\cdot} X = 0_{R}$
23	1 2 3	ringlidm	$⊢ (R \in Ring \land X \in B) \to \underset{˙}{1} \underset{˙}{\cdot} X = X$
24	5 6 23	syl2anc	$⊢ φ \to \underset{˙}{1} \underset{˙}{\cdot} X = X$
25	24	oveq1d	$⊢ φ \to (\underset{˙}{1} \underset{˙}{\cdot} X) +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X) = X +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X)$
26	15 22 25	3eqtr3rd	$⊢ φ \to X +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X) = 0_{R}$
27	1 2	ringcl	$⊢ (R \in Ring \land N (\underset{˙}{1}) \in B \land X \in B) \to N (\underset{˙}{1}) \underset{˙}{\cdot} X \in B$
28	5 12 6 27	syl3anc	$⊢ φ \to N (\underset{˙}{1}) \underset{˙}{\cdot} X \in B$
29	1 13 16 4	grpinvid1	$⊢ (R \in Grp \land X \in B \land N (\underset{˙}{1}) \underset{˙}{\cdot} X \in B) \to (N (X) = N (\underset{˙}{1}) \underset{˙}{\cdot} X \leftrightarrow X +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X) = 0_{R})$
30	10 6 28 29	syl3anc	$⊢ φ \to (N (X) = N (\underset{˙}{1}) \underset{˙}{\cdot} X \leftrightarrow X +_{R} (N (\underset{˙}{1}) \underset{˙}{\cdot} X) = 0_{R})$
31	26 30	mpbird	$⊢ φ \to N (X) = N (\underset{˙}{1}) \underset{˙}{\cdot} X$
32	31	eqcomd	$⊢ φ \to N (\underset{˙}{1}) \underset{˙}{\cdot} X = N (X)$

Metamath Proof Explorer

Theorem ringnegl

Proof