bpolydif

Description: Calculate the difference between successive values of the Bernoulli polynomials. (Contributed by Scott Fenton, 16-May-2014) (Proof shortened by Mario Carneiro, 26-May-2014)

		Ref	Expression
	Assertion	bpolydif	$⊢ (N \in ℕ \land X \in ℂ) \to (N BernPoly (X + 1)) - (N BernPoly X) = N X^{N - 1}$

Proof

Step	Hyp	Ref	Expression
1		oveq1	$⊢ n = k \to n BernPoly (X + 1) = k BernPoly (X + 1)$
2		oveq1	$⊢ n = k \to n BernPoly X = k BernPoly X$
3	1 2	oveq12d	$⊢ n = k \to (n BernPoly (X + 1)) - (n BernPoly X) = (k BernPoly (X + 1)) - (k BernPoly X)$
4		id	$⊢ n = k \to n = k$
5		oveq1	$⊢ n = k \to n - 1 = k - 1$
6	5	oveq2d	$⊢ n = k \to X^{n - 1} = X^{k - 1}$
7	4 6	oveq12d	$⊢ n = k \to n X^{n - 1} = k X^{k - 1}$
8	3 7	eqeq12d	$⊢ n = k \to ((n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1} \leftrightarrow (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1})$
9	8	imbi2d	$⊢ n = k \to ((X \in ℂ \to (n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1}) \leftrightarrow (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}))$
10		oveq1	$⊢ n = N \to n BernPoly (X + 1) = N BernPoly (X + 1)$
11		oveq1	$⊢ n = N \to n BernPoly X = N BernPoly X$
12	10 11	oveq12d	$⊢ n = N \to (n BernPoly (X + 1)) - (n BernPoly X) = (N BernPoly (X + 1)) - (N BernPoly X)$
13		id	$⊢ n = N \to n = N$
14		oveq1	$⊢ n = N \to n - 1 = N - 1$
15	14	oveq2d	$⊢ n = N \to X^{n - 1} = X^{N - 1}$
16	13 15	oveq12d	$⊢ n = N \to n X^{n - 1} = N X^{N - 1}$
17	12 16	eqeq12d	$⊢ n = N \to ((n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1} \leftrightarrow (N BernPoly (X + 1)) - (N BernPoly X) = N X^{N - 1})$
18	17	imbi2d	$⊢ n = N \to ((X \in ℂ \to (n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1}) \leftrightarrow (X \in ℂ \to (N BernPoly (X + 1)) - (N BernPoly X) = N X^{N - 1}))$
19		simp1	$⊢ (n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \to n \in ℕ$
20		simp3	$⊢ (n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \to X \in ℂ$
21		simpl3	$⊢ ((n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \land m \in (1 \dots n - 1)) \to X \in ℂ$
22		oveq1	$⊢ k = m \to k BernPoly (X + 1) = m BernPoly (X + 1)$
23		oveq1	$⊢ k = m \to k BernPoly X = m BernPoly X$
24	22 23	oveq12d	$⊢ k = m \to (k BernPoly (X + 1)) - (k BernPoly X) = (m BernPoly (X + 1)) - (m BernPoly X)$
25		id	$⊢ k = m \to k = m$
26		oveq1	$⊢ k = m \to k - 1 = m - 1$
27	26	oveq2d	$⊢ k = m \to X^{k - 1} = X^{m - 1}$
28	25 27	oveq12d	$⊢ k = m \to k X^{k - 1} = m X^{m - 1}$
29	24 28	eqeq12d	$⊢ k = m \to ((k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1} \leftrightarrow (m BernPoly (X + 1)) - (m BernPoly X) = m X^{m - 1})$
30	29	imbi2d	$⊢ k = m \to ((X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \leftrightarrow (X \in ℂ \to (m BernPoly (X + 1)) - (m BernPoly X) = m X^{m - 1}))$
31	30	rspccva	$⊢ (\forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land m \in (1 \dots n - 1)) \to (X \in ℂ \to (m BernPoly (X + 1)) - (m BernPoly X) = m X^{m - 1})$
32	31	3ad2antl2	$⊢ ((n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \land m \in (1 \dots n - 1)) \to (X \in ℂ \to (m BernPoly (X + 1)) - (m BernPoly X) = m X^{m - 1})$
33	21 32	mpd	$⊢ ((n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \land m \in (1 \dots n - 1)) \to (m BernPoly (X + 1)) - (m BernPoly X) = m X^{m - 1}$
34	19 20 33	bpolydiflem	$⊢ (n \in ℕ \land \forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \land X \in ℂ) \to (n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1}$
35	34	3exp	$⊢ n \in ℕ \to (\forall k \in (1 \dots n - 1) (X \in ℂ \to (k BernPoly (X + 1)) - (k BernPoly X) = k X^{k - 1}) \to (X \in ℂ \to (n BernPoly (X + 1)) - (n BernPoly X) = n X^{n - 1}))$
36	9 18 35	nnsinds	$⊢ N \in ℕ \to (X \in ℂ \to (N BernPoly (X + 1)) - (N BernPoly X) = N X^{N - 1})$
37	36	imp	$⊢ (N \in ℕ \land X \in ℂ) \to (N BernPoly (X + 1)) - (N BernPoly X) = N X^{N - 1}$

Metamath Proof Explorer

Theorem bpolydif

Proof