df-nsg

Description: Define the equivalence relation in a quotient ring or quotient group (where i is a two-sided ideal or a normal subgroup). For non-normal subgroups this generates the left cosets. (Contributed by Mario Carneiro, 15-Jun-2015)

		Ref	Expression
	Assertion	df-nsg	$⊢ NrmSGrp = (w \in Grp ⟼ \{s \in SubGrp (w) \| \underset{˙}{[} {Base}_{w} / b \underset{˙}{]} \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)\})$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cnsg	$class NrmSGrp$
1		vw	$setvar w$
2		cgrp	$class Grp$
3		vs	$setvar s$
4		csubg	$class SubGrp$
5	1	cv	$setvar w$
6	5 4	cfv	$class SubGrp (w)$
7		cbs	$class Base$
8	5 7	cfv	$class {Base}_{w}$
9		vb	$setvar b$
10		cplusg	$class +_{𝑔}$
11	5 10	cfv	$class +_{w}$
12		vp	$setvar p$
13		vx	$setvar x$
14	9	cv	$setvar b$
15		vy	$setvar y$
16	13	cv	$setvar x$
17	12	cv	$setvar p$
18	15	cv	$setvar y$
19	16 18 17	co	$class (x p y)$
20	3	cv	$setvar s$
21	19 20	wcel	$wff x p y \in s$
22	18 16 17	co	$class (y p x)$
23	22 20	wcel	$wff y p x \in s$
24	21 23	wb	$wff (x p y \in s \leftrightarrow y p x \in s)$
25	24 15 14	wral	$wff \forall y \in b (x p y \in s \leftrightarrow y p x \in s)$
26	25 13 14	wral	$wff \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)$
27	26 12 11	wsbc	$wff \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)$
28	27 9 8	wsbc	$wff \underset{˙}{[} {Base}_{w} / b \underset{˙}{]} \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)$
29	28 3 6	crab	$class \{s \in SubGrp (w) \| \underset{˙}{[} {Base}_{w} / b \underset{˙}{]} \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)\}$
30	1 2 29	cmpt	$class (w \in Grp ⟼ \{s \in SubGrp (w) \| \underset{˙}{[} {Base}_{w} / b \underset{˙}{]} \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)\})$
31	0 30	wceq	$wff NrmSGrp = (w \in Grp ⟼ \{s \in SubGrp (w) \| \underset{˙}{[} {Base}_{w} / b \underset{˙}{]} \underset{˙}{[} +_{w} / p \underset{˙}{]} \forall x \in b \forall y \in b (x p y \in s \leftrightarrow y p x \in s)\})$

Metamath Proof Explorer

Definition df-nsg

Detailed syntax breakdown