Metamath Proof Explorer

Theorem lgsval4lem

Description: Lemma for lgsval4 . (Contributed by Mario Carneiro, 4-Feb-2015)

		Ref	Expression
	Hypothesis	lgsval.1	$⊢ F = (n \in ℕ ⟼ if (n \in ℙ, {if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)}^{n pCnt N}, 1))$
	Assertion	lgsval4lem	$⊢ (A \in ℤ \land N \in ℤ \land N \neq 0) \to F = (n \in ℕ ⟼ if (n \in ℙ, {(A /_{L} n)}^{n pCnt N}, 1))$

Proof

Step	Hyp	Ref	Expression
1		lgsval.1	$⊢ F = (n \in ℕ ⟼ if (n \in ℙ, {if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)}^{n pCnt N}, 1))$
2		eqid	$⊢ (m \in ℕ ⟼ if (m \in ℙ, {if (m = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{m - 1}{2}} + 1) \mod m) - 1)}^{m pCnt n}, 1)) = (m \in ℕ ⟼ if (m \in ℙ, {if (m = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{m - 1}{2}} + 1) \mod m) - 1)}^{m pCnt n}, 1))$
3	2	lgsval2lem	$⊢ (A \in ℤ \land n \in ℙ) \to A /_{L} n = if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)$
4	3	3ad2antl1	$⊢ ((A \in ℤ \land N \in ℤ \land N \neq 0) \land n \in ℙ) \to A /_{L} n = if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)$
5	4	oveq1d	$⊢ ((A \in ℤ \land N \in ℤ \land N \neq 0) \land n \in ℙ) \to {(A /_{L} n)}^{n pCnt N} = {if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)}^{n pCnt N}$
6	5	ifeq1da	$⊢ (A \in ℤ \land N \in ℤ \land N \neq 0) \to if (n \in ℙ, {(A /_{L} n)}^{n pCnt N}, 1) = if (n \in ℙ, {if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)}^{n pCnt N}, 1)$
7	6	mpteq2dv	$⊢ (A \in ℤ \land N \in ℤ \land N \neq 0) \to (n \in ℕ ⟼ if (n \in ℙ, {(A /_{L} n)}^{n pCnt N}, 1)) = (n \in ℕ ⟼ if (n \in ℙ, {if (n = 2, if (2 ∥ A, 0, if (A \mod 8 \in \{1, 7\}, 1, - 1)), ((A^{\frac{n - 1}{2}} + 1) \mod n) - 1)}^{n pCnt N}, 1))$
8	1 7	eqtr4id	$⊢ (A \in ℤ \land N \in ℤ \land N \neq 0) \to F = (n \in ℕ ⟼ if (n \in ℙ, {(A /_{L} n)}^{n pCnt N}, 1))$