Metamath Proof Explorer

Theorem ismndo1

Description: The predicate "is a monoid". (Contributed by FL, 2-Nov-2009) (Revised by Mario Carneiro, 22-Dec-2013) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	ismndo1.1	$⊢ X = dom dom G$
	Assertion	ismndo1	$⊢ G \in A \to (G \in MndOp \leftrightarrow (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)))$

Proof

Step	Hyp	Ref	Expression
1		ismndo1.1	$⊢ X = dom dom G$
2	1	ismndo	$⊢ G \in A \to (G \in MndOp \leftrightarrow (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)))$
3	1	smgrpmgm	$⊢ G \in SemiGrp \to G : X \times X ⟶ X$
4	3	ad2antrl	$⊢ (G \in A \land (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to G : X \times X ⟶ X$
5	1	smgrpassOLD	$⊢ G \in SemiGrp \to \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z)$
6	5	ad2antrl	$⊢ (G \in A \land (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z)$
7		simprr	$⊢ (G \in A \land (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to \exists x \in X \forall y \in X (x G y = y \land y G x = y)$
8	4 6 7	3jca	$⊢ (G \in A \land (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))$
9		3simpa	$⊢ (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)) \to (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z))$
10	1	issmgrpOLD	$⊢ G \in A \to (G \in SemiGrp \leftrightarrow (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z)))$
11	9 10	syl5ibr	$⊢ G \in A \to ((G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)) \to G \in SemiGrp)$
12	11	imp	$⊢ (G \in A \land (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to G \in SemiGrp$
13		simpr3	$⊢ (G \in A \land (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to \exists x \in X \forall y \in X (x G y = y \land y G x = y)$
14	12 13	jca	$⊢ (G \in A \land (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))) \to (G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y))$
15	8 14	impbida	$⊢ G \in A \to ((G \in SemiGrp \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)) \leftrightarrow (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)))$
16	2 15	bitrd	$⊢ G \in A \to (G \in MndOp \leftrightarrow (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists x \in X \forall y \in X (x G y = y \land y G x = y)))$