df-rng

Description: Define the class of all non-unital rings. Anon-unital ring (or rng, or pseudoring) is a set equipped with two everywhere-defined internal operations, whose first one is an additive abelian group operation and the second one is a multiplicative semigroup operation, and where the addition is left- and right-distributive for the multiplication. Definition of a pseudo-ring in section I.8.1 of BourbakiAlg1 p. 93 or the definition of a ring in part Preliminaries of Roman p. 18. As almost always in mathematics, "non-unital" means "not necessarily unital". Therefore, by talking about a ring (in general) or a non-unital ring the "unital" case is always included. In contrast to a unital ring, the commutativity of addition must be postulated and cannot be proven from the other conditions. (Contributed by AV, 6-Jan-2020)

		Ref	Expression
	Assertion	df-rng	\|- Rng = { f e. Abel \| ( ( mulGrp ` f ) e. Smgrp /\ [. ( Base ` f ) / b ]. [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) ) ) }

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		crng	\|- Rng
1		vf	\|- f
2		cabl	\|- Abel
3		cmgp	\|- mulGrp
4	1	cv	\|- f
5	4 3	cfv	\|- ( mulGrp ` f )
6		csgrp	\|- Smgrp
7	5 6	wcel	\|- ( mulGrp ` f ) e. Smgrp
8		cbs	\|- Base
9	4 8	cfv	\|- ( Base ` f )
10		vb	\|- b
11		cplusg	\|- +g
12	4 11	cfv	\|- ( +g ` f )
13		vp	\|- p
14		cmulr	\|- .r
15	4 14	cfv	\|- ( .r ` f )
16		vt	\|- t
17		vx	\|- x
18	10	cv	\|- b
19		vy	\|- y
20		vz	\|- z
21	17	cv	\|- x
22	16	cv	\|- t
23	19	cv	\|- y
24	13	cv	\|- p
25	20	cv	\|- z
26	23 25 24	co	\|- ( y p z )
27	21 26 22	co	\|- ( x t ( y p z ) )
28	21 23 22	co	\|- ( x t y )
29	21 25 22	co	\|- ( x t z )
30	28 29 24	co	\|- ( ( x t y ) p ( x t z ) )
31	27 30	wceq	\|- ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) )
32	21 23 24	co	\|- ( x p y )
33	32 25 22	co	\|- ( ( x p y ) t z )
34	23 25 22	co	\|- ( y t z )
35	29 34 24	co	\|- ( ( x t z ) p ( y t z ) )
36	33 35	wceq	\|- ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) )
37	31 36	wa	\|- ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
38	37 20 18	wral	\|- A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
39	38 19 18	wral	\|- A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
40	39 17 18	wral	\|- A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
41	40 16 15	wsbc	\|- [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
42	41 13 12	wsbc	\|- [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
43	42 10 9	wsbc	\|- [. ( Base ` f ) / b ]. [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) )
44	7 43	wa	\|- ( ( mulGrp ` f ) e. Smgrp /\ [. ( Base ` f ) / b ]. [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) ) )
45	44 1 2	crab	\|- { f e. Abel \| ( ( mulGrp ` f ) e. Smgrp /\ [. ( Base ` f ) / b ]. [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) ) ) }
46	0 45	wceq	\|- Rng = { f e. Abel \| ( ( mulGrp ` f ) e. Smgrp /\ [. ( Base ` f ) / b ]. [. ( +g ` f ) / p ]. [. ( .r ` f ) / t ]. A. x e. b A. y e. b A. z e. b ( ( x t ( y p z ) ) = ( ( x t y ) p ( x t z ) ) /\ ( ( x p y ) t z ) = ( ( x t z ) p ( y t z ) ) ) ) }

Metamath Proof Explorer

Definition df-rng

Detailed syntax breakdown