idlaut

Description: The identity function is a lattice automorphism. (Contributed by NM, 18-May-2012)

Step	Hyp	Ref	Expression
1		idlaut.b	$⊢ B = {Base}_{K}$
2		idlaut.i	$⊢ I = LAut (K)$
3		f1oi	$⊢ ({I ↾}_{B}) : B \underset{1-1 onto}{⟶} B$
4	3	a1i	$⊢ K \in A \to ({I ↾}_{B}) : B \underset{1-1 onto}{⟶} B$
5		fvresi	$⊢ x \in B \to ({I ↾}_{B}) (x) = x$
6		fvresi	$⊢ y \in B \to ({I ↾}_{B}) (y) = y$
7	5 6	breqan12d	$⊢ (x \in B \land y \in B) \to (({I ↾}_{B}) (x) \leq_{K} ({I ↾}_{B}) (y) \leftrightarrow x \leq_{K} y)$
8	7	bicomd	$⊢ (x \in B \land y \in B) \to (x \leq_{K} y \leftrightarrow ({I ↾}_{B}) (x) \leq_{K} ({I ↾}_{B}) (y))$
9	8	rgen2	$⊢ \forall x \in B \forall y \in B (x \leq_{K} y \leftrightarrow ({I ↾}_{B}) (x) \leq_{K} ({I ↾}_{B}) (y))$
10	9	a1i	$⊢ K \in A \to \forall x \in B \forall y \in B (x \leq_{K} y \leftrightarrow ({I ↾}_{B}) (x) \leq_{K} ({I ↾}_{B}) (y))$
11		eqid	$⊢ \leq_{K} = \leq_{K}$
12	1 11 2	islaut	$⊢ K \in A \to ({I ↾}_{B} \in I \leftrightarrow (({I ↾}_{B}) : B \underset{1-1 onto}{⟶} B \land \forall x \in B \forall y \in B (x \leq_{K} y \leftrightarrow ({I ↾}_{B}) (x) \leq_{K} ({I ↾}_{B}) (y))))$
13	4 10 12	mpbir2and	$⊢ K \in A \to {I ↾}_{B} \in I$

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