df-bpoly

Description: Define the Bernoulli polynomials. Here we use well-founded recursion to define the Bernoulli polynomials. This agrees with most textbook definitions, although explicit formulas do exist. (Contributed by Scott Fenton, 22-May-2014)

		Ref	Expression
	Assertion	df-bpoly	$⊢ BernPoly = (m \in ℕ_{0}, x \in ℂ ⟼ wrecs (< ℕ_{0} (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})))) (m))$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cbp	$class BernPoly$
1		vm	$setvar m$
2		cn0	$class ℕ_{0}$
3		vx	$setvar x$
4		cc	$class ℂ$
5		clt	$class <$
6		vg	$setvar g$
7		cvv	$class V$
8		chash	$class \|.\|$
9	6	cv	$setvar g$
10	9	cdm	$class dom g$
11	10 8	cfv	$class \|dom g\|$
12		vn	$setvar n$
13	3	cv	$setvar x$
14		cexp	$class^$
15	12	cv	$setvar n$
16	13 15 14	co	$class x^{n}$
17		cmin	$class -$
18		vk	$setvar k$
19		cbc	$class (\binom{.}{.})$
20	18	cv	$setvar k$
21	15 20 19	co	$class (\binom{n}{k})$
22		cmul	$class \times$
23	20 9	cfv	$class g (k)$
24		cdiv	$class \div$
25	15 20 17	co	$class (n - k)$
26		caddc	$class +$
27		c1	$class 1$
28	25 27 26	co	$class (n - k + 1)$
29	23 28 24	co	$class (\frac{g (k)}{n - k + 1})$
30	21 29 22	co	$class (\binom{n}{k}) (\frac{g (k)}{n - k + 1})$
31	10 30 18	csu	$class \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})$
32	16 31 17	co	$class (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1}))$
33	12 11 32	csb	$class ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1}))$
34	6 7 33	cmpt	$class (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})))$
35	2 5 34	cwrecs	$class wrecs (< ℕ_{0} (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1}))))$
36	1	cv	$setvar m$
37	36 35	cfv	$class wrecs (< ℕ_{0} (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})))) (m)$
38	1 3 2 4 37	cmpo	$class (m \in ℕ_{0}, x \in ℂ ⟼ wrecs (< ℕ_{0} (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})))) (m))$
39	0 38	wceq	$wff BernPoly = (m \in ℕ_{0}, x \in ℂ ⟼ wrecs (< ℕ_{0} (g \in V ⟼ ⦋ \|dom g\| / n ⦌ (x^{n} - \sum_{k \in dom g} (\binom{n}{k}) (\frac{g (k)}{n - k + 1})))) (m))$

Metamath Proof Explorer

Definition df-bpoly

Detailed syntax breakdown