relexpiidm

Description: Any power of any restriction of the identity relation is itself. (Contributed by RP, 12-Jun-2020)

		Ref	Expression
	Assertion	relexpiidm	$⊢ (A \in V \land N \in ℕ_{0}) \to ({I ↾}_{A}) ↑_{r} N = {I ↾}_{A}$

Proof

Step	Hyp	Ref	Expression
1		oveq2	$⊢ x = 0 \to ({I ↾}_{A}) ↑_{r} x = ({I ↾}_{A}) ↑_{r} 0$
2	1	eqeq1d	$⊢ x = 0 \to (({I ↾}_{A}) ↑_{r} x = {I ↾}_{A} \leftrightarrow ({I ↾}_{A}) ↑_{r} 0 = {I ↾}_{A})$
3	2	imbi2d	$⊢ x = 0 \to ((A \in V \to ({I ↾}_{A}) ↑_{r} x = {I ↾}_{A}) \leftrightarrow (A \in V \to ({I ↾}_{A}) ↑_{r} 0 = {I ↾}_{A}))$
4		oveq2	$⊢ x = y \to ({I ↾}_{A}) ↑_{r} x = ({I ↾}_{A}) ↑_{r} y$
5	4	eqeq1d	$⊢ x = y \to (({I ↾}_{A}) ↑_{r} x = {I ↾}_{A} \leftrightarrow ({I ↾}_{A}) ↑_{r} y = {I ↾}_{A})$
6	5	imbi2d	$⊢ x = y \to ((A \in V \to ({I ↾}_{A}) ↑_{r} x = {I ↾}_{A}) \leftrightarrow (A \in V \to ({I ↾}_{A}) ↑_{r} y = {I ↾}_{A}))$
7		oveq2	$⊢ x = y + 1 \to ({I ↾}_{A}) ↑_{r} x = ({I ↾}_{A}) ↑_{r} (y + 1)$
8	7	eqeq1d	$⊢ x = y + 1 \to (({I ↾}_{A}) ↑_{r} x = {I ↾}_{A} \leftrightarrow ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A})$
9	8	imbi2d	$⊢ x = y + 1 \to ((A \in V \to ({I ↾}_{A}) ↑_{r} x = {I ↾}_{A}) \leftrightarrow (A \in V \to ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A}))$
10		oveq2	$⊢ x = N \to ({I ↾}_{A}) ↑_{r} x = ({I ↾}_{A}) ↑_{r} N$
11	10	eqeq1d	$⊢ x = N \to (({I ↾}_{A}) ↑_{r} x = {I ↾}_{A} \leftrightarrow ({I ↾}_{A}) ↑_{r} N = {I ↾}_{A})$
12	11	imbi2d	$⊢ x = N \to ((A \in V \to ({I ↾}_{A}) ↑_{r} x = {I ↾}_{A}) \leftrightarrow (A \in V \to ({I ↾}_{A}) ↑_{r} N = {I ↾}_{A}))$
13		resiexg	$⊢ A \in V \to {I ↾}_{A} \in V$
14		relexp0g	$⊢ {I ↾}_{A} \in V \to ({I ↾}_{A}) ↑_{r} 0 = {I ↾}_{(dom ({I ↾}_{A}) \cup ran ({I ↾}_{A}))}$
15	13 14	syl	$⊢ A \in V \to ({I ↾}_{A}) ↑_{r} 0 = {I ↾}_{(dom ({I ↾}_{A}) \cup ran ({I ↾}_{A}))}$
16		dmresi	$⊢ dom ({I ↾}_{A}) = A$
17		rnresi	$⊢ ran ({I ↾}_{A}) = A$
18	16 17	uneq12i	$⊢ dom ({I ↾}_{A}) \cup ran ({I ↾}_{A}) = A \cup A$
19		unidm	$⊢ A \cup A = A$
20	18 19	eqtri	$⊢ dom ({I ↾}_{A}) \cup ran ({I ↾}_{A}) = A$
21	20	reseq2i	$⊢ {I ↾}_{(dom ({I ↾}_{A}) \cup ran ({I ↾}_{A}))} = {I ↾}_{A}$
22	15 21	eqtrdi	$⊢ A \in V \to ({I ↾}_{A}) ↑_{r} 0 = {I ↾}_{A}$
23		relres	$⊢ Rel ({I ↾}_{A})$
24	23	a1i	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to Rel ({I ↾}_{A})$
25		simp3	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to y \in ℕ_{0}$
26	24 25	relexpsucrd	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to ({I ↾}_{A}) ↑_{r} (y + 1) = (({I ↾}_{A}) ↑_{r} y) \circ ({I ↾}_{A})$
27		simp1	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to ({I ↾}_{A}) ↑_{r} y = {I ↾}_{A}$
28	27	coeq1d	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to (({I ↾}_{A}) ↑_{r} y) \circ ({I ↾}_{A}) = ({I ↾}_{A}) \circ ({I ↾}_{A})$
29		coires1	$⊢ ({I ↾}_{A}) \circ ({I ↾}_{A}) = {({I ↾}_{A}) ↾}_{A}$
30		residm	$⊢ {({I ↾}_{A}) ↾}_{A} = {I ↾}_{A}$
31	29 30	eqtri	$⊢ ({I ↾}_{A}) \circ ({I ↾}_{A}) = {I ↾}_{A}$
32	28 31	eqtrdi	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to (({I ↾}_{A}) ↑_{r} y) \circ ({I ↾}_{A}) = {I ↾}_{A}$
33	26 32	eqtrd	$⊢ (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \land A \in V \land y \in ℕ_{0}) \to ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A}$
34	33	3exp	$⊢ ({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \to (A \in V \to (y \in ℕ_{0} \to ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A}))$
35	34	com13	$⊢ y \in ℕ_{0} \to (A \in V \to (({I ↾}_{A}) ↑_{r} y = {I ↾}_{A} \to ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A}))$
36	35	a2d	$⊢ y \in ℕ_{0} \to ((A \in V \to ({I ↾}_{A}) ↑_{r} y = {I ↾}_{A}) \to (A \in V \to ({I ↾}_{A}) ↑_{r} (y + 1) = {I ↾}_{A}))$
37	3 6 9 12 22 36	nn0ind	$⊢ N \in ℕ_{0} \to (A \in V \to ({I ↾}_{A}) ↑_{r} N = {I ↾}_{A})$
38	37	impcom	$⊢ (A \in V \land N \in ℕ_{0}) \to ({I ↾}_{A}) ↑_{r} N = {I ↾}_{A}$

Metamath Proof Explorer

Theorem relexpiidm

Proof