Higher Order Bernoulli and Euler Numbers

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Transcript Higher Order Bernoulli and Euler Numbers

David Vella,
Skidmore College
[email protected]
Generating Functions and
Exponential Generating Functions
β€’ Given a sequence {π‘Žπ‘› } we can associate to it
two functions determined by power series:
β€’ Its (ordinary) generating function is
∞
𝒂𝒏 𝒙𝒏
𝑓 𝒙 =
𝒏=𝟏
β€’ Its exponential generating function is
∞
𝒂𝒏 𝒏
π’ˆ 𝒙 =
𝒙
𝒏!
𝒏=𝟏
Examples
β€’ The o.g.f and the e.g.f of {1,1,1,1,...} are:
2
3
β€’ f(x) = 1 + π‘₯ + π‘₯ + π‘₯ + β‹― =
β€’ g(x) = 1 +
π‘₯
1!
+
π‘₯2
2!
+
π‘₯3
3!
1
,
1βˆ’π‘₯
and
+ β‹― = 𝑒 π‘₯ , respectively.
The second one explains the name...
Operations on the functions correspond to manipulations
on the sequence. For example, adding two sequences
corresponds to adding the ogf’s, while to shift the index
of a sequence, we multiply the ogf by x, or differentiate
the egf. Thus, the functions provide a convenient way of
studying the sequences.
Here are a few more famous examples:
Bernoulli & Euler Numbers
β€’ The Bernoulli Numbers Bn are defined by
the following egf:
x
ο€½
x
e ο€­1
ο‚₯
οƒ₯
n ο€½1
Bn n
x
n!
β€’ The Euler Numbers En are defined by the
following egf:
x
ο‚₯
2e
En n
Sech( x) ο€½ 2 x
ο€½οƒ₯ x
e  1 nο€½0 n!
Catalan and Bell Numbers
β€’ The Catalan Numbers Cn are known to have the
ogf:
∞
1 βˆ’ 1 βˆ’ 4π‘₯
2
𝐢 π‘₯ =
𝐢𝑛 π‘₯ =
=
2π‘₯
1 + 1 βˆ’ 4π‘₯
𝑛=1
𝑛
β€’ Let Sn denote the number of different ways of
partitioning a set with n elements into nonempty
subsets. It is called a Bell number. It is known
to have the egf:
∞
𝑆𝑛 𝑛
π‘₯ βˆ’1
𝑒
π‘₯ =𝑒
𝑛!
𝑛=1
Higher Order Bernoulli and Euler Numbers
β€’ The nth Bernoulli Number of order w, Bwn is
defined for positive integer w by:
w
ο‚₯
B n
 x οƒΆ
x
 x οƒ· ο€½οƒ₯
 e ο€­1 οƒΈ
n ο€½1 n!
w
n
β€’ The nth Euler Number of order w, Ewn is
similarly defined for positive integer w as:
∞
𝑀
π‘₯
2𝑒
𝐸𝑀 𝑛 𝑛
=
π‘₯
2π‘₯
𝑒 +1
𝑛!
𝑛=1
Reversing the Process
β€’ If you start with a function and ask what sequence generates it
(as an ogf), the answer is given by Taylor’s theorem:
𝑓
𝑛
(0)
𝑐𝑛 =
𝑛!
β€’ More generally, if we use powers of (x-a) in place of powers of
x, Taylor’s theorem gives:
𝑓 𝑛 (π‘Ž)
𝑐𝑛 =
𝑛!
β€’ Let us abbreviate the n’th Taylor coefficient of f about x = a by:
𝑇𝑛 𝑓; π‘Ž =
𝑓
𝑛
(π‘Ž)
𝑛!
A Key Question
β€’ I have mentioned that operations on the functions correspond
to manipulations of the sequence. What manipulations
correspond to composing the generating functions?
β€’ That is, we are asking to express
𝑇𝑛 𝑓 βƒ˜π‘”; π‘Ž
in terms of the Taylor coefficients of f and of g.
β€’ In January, 2008, I published a paper entitled Explicit
Formulas for Bernoulli and Euler Numbers, in the
electronic journal Integers. In this paper, I answer the above
question and give some applications of the answer.
A Key Answer
β€’ Since
𝑇𝑛 𝑓 βƒ˜π‘”; π‘Ž =
𝑓 βƒ˜π‘”
(𝑛) (π‘Ž)
𝑛!
,
the answer would depend on evaluating the numerator, which
means extending the chain rule to nth derivatives. This was
done (and published by Faà di Bruno in 1855.) I noticed (in
1994) a corollary of di Bruno’s formula which exactly answers the
above question.
β€’ Francesco Faà di Bruno:
THE MAIN RESULT
With the above definitions, if both 𝑦 = 𝑓(π‘₯) and π‘₯ = 𝑔(𝑑) have n
derivatives, then so does 𝑦 = 𝑓 βƒ˜ 𝑔(𝑑), and
𝑻𝒏 𝒇 βƒ˜π’ˆ; 𝒂 =
π…βˆˆπ‘·π’
𝒍 𝝅
𝜹 𝝅
𝑛
𝑇𝑙
πœ‹
(𝑓; 𝑔 π‘Ž )
𝑇𝑖 (𝑔; π‘Ž)
πœ‹π‘–
𝑖=1
where 𝑃𝑛 is the set of partitions of n, 𝑙 πœ‹ is the length of the
partition πœ‹, and πœ‹π‘– is the multiplicity of i as a part of πœ‹. Here, 𝛿 πœ‹
is the set of multiplicities {πœ‹π‘– } which is itself a partition of 𝑙 πœ‹ (I call
it the derived partition 𝛿 πœ‹ ), and 𝛿𝑙 πœ‹πœ‹ is the associated
multinomial coefficient
𝑙 πœ‹ !
.
πœ‹1 !πœ‹2 !β€¦πœ‹π‘› !
Illustration – How to use this machine
β€’ Let 𝑓 π‘₯ = 𝑒 π‘₯ and let π‘₯ = 𝑔 𝑑 = 𝑒 𝑑 βˆ’ 1 Set π‘Ž = 0 and
observe 𝑔 π‘Ž = 0. Then:
π‘‡π‘š 𝑓; 𝑔 0
𝑇𝑖 𝑔; 0 =
=
1
𝑖!
for all m and similarly,
if 𝑖 β‰₯ 1. The right side becomes:
𝑛!
𝑛!
1
𝑛!
1
π‘š!
πœ‹βˆˆπ‘ƒπ‘›
πœ‹βˆˆπ‘ƒπ‘›
𝑙 πœ‹
𝛿 πœ‹
1
𝑙(πœ‹)!
1 𝑛! 1
=
𝛿 πœ‹ ! πœ‹! 𝑛!
𝑛
𝑖=1
1
𝑖!
π‘†πœ‹
πœ‹βˆˆπ‘ƒπ‘›
πœ‹π‘–
𝑆𝑛
=
𝑛!
Illustrations, continued
β€’ But the left hand side is 𝑇𝑛 𝑓 βƒ˜π‘”; 0 for the
composite function
𝑓 βƒ˜π‘”(𝑑) = 𝑒
𝑒 𝑑 βˆ’1
So we just proved this is the egf for the
sequence of Bell numbers 𝑆𝑛 . This is a very
short proof of a known (and famous) result.
Likewise, I can provide new proofs of many
combinatorial identities using this technique.
Can we discover new results with this machine?
Yes!
Illustrations, continued
ln(1+π‘₯)
Let 𝑓 π‘₯ =
and 𝑔 𝑑 = 𝑒 𝑑 βˆ’ 1. Again if π‘Ž = 0 then
π‘₯
𝑑
𝑔 π‘Ž = 𝑔 0 = 0. Also we have 𝑓 βƒ˜π‘” 𝑑 = 𝑑
which is
𝑒 βˆ’1
precisely the egf of the Bernoulli numbers. In this case, our
machine yields the formulas:
(ο€­1)  ( )  ( )  n οƒΆ

 οƒ·οƒ·
Bn ο€½ οƒ₯
 οƒŽPn 1   ( )   ( )   οƒΈ
and:
(ο€­1) m
Bn ο€½ οƒ₯
m! S (n, m)
m ο€½1 1  m
n
where S(n,m) is the number of ways of partitioning a set of size
n into m nonempty subsets (a Stirling number of the 2nd kind.)
Illustrations, continued
β€’ This was published in my 2008 paper, along with similar
formulas for Euler numbers.
β€’ These formulas can be generalized in at least two ways:
1. Express the higher order Bernoulli numbers in terms of the
usual Bernoulli numbers, since the egf for them is obviously
a composite. Similarly for the higher order Euler numbers.
This result is still unpublished (but I spoke at HRUMC a
couple of years ago about it.)
2. Generalize my corollary of di Bruno’s formula to the
multivariable case. (The next talk is about this in the case of
multivariable Bernoulli numbers!)
β€’ For the remainder of this talk, I’d like to focus on one case
where the identity I obtain from my machine is not obviously
useful (or is it?)
Final Example: the Catalan numbers
β€’ Recall from an earlier slide the generating function (ogf) of the
Catalan numbers:
∞
1 βˆ’ 1 βˆ’ 4π‘₯
2
𝑛
𝐢 π‘₯ =
𝐢𝑛 π‘₯ =
=
2π‘₯
1 + 1 βˆ’ 4π‘₯
𝑛=1
β€’ This can be expressed as a composite generating function as
2
follows: Let 𝑓 𝑒 =
and let 𝑒 = 𝑔 π‘₯ = 1 βˆ’ 4π‘₯. Then
1+𝑒
𝐢 π‘₯ = 𝑓 𝑔 π‘₯ . If π‘Ž = 0 then 𝑔 π‘Ž = 1, so the derivatives and
Taylor coefficients of 𝑓 𝑒 have to be evaluated at 𝑒 = 1.
β€’ It is easy to check by direct calculation that 𝑓
and therefore π‘‡π‘š 𝑓; 1 =
π‘“π‘š 1
π‘š!
=
(βˆ’1)π‘š
.
π‘š
2
π‘š
1 =
(βˆ’1)π‘š π‘š!
2π‘š
Catalan numbers, continued
β€’ To find 𝑇𝑖 (𝑔; 0), we write the radical as a power and use
Newton’s binomial series:
𝑔 π‘₯ = 1 βˆ’ 4π‘₯
πœ‹βˆˆπ‘ƒπ‘›
2
1
It follows that 𝑇𝑖 𝑔; 0 =
𝐢𝑛 =
1
𝑖
2
1
∞
2
π‘˜=0 π‘˜
=
βˆ’4 𝑖 .
So our formula yields:
βˆ’1
2𝑙(πœ‹)
πœ‹π‘–
𝑛
𝑙(πœ‹)
𝑙 πœ‹
𝛿 πœ‹
βˆ’4 π‘˜ π‘₯ π‘˜ .
1
𝑖
𝑖=1
2
βˆ’4
However, we can simplify this because
𝑛
βˆ’4
𝑖=1
𝑖
πœ‹π‘–
= βˆ’4
π‘–πœ‹π‘–
= βˆ’4
𝑛
𝑖
Simplifications
Thus,
𝐢𝑛 =
4𝑛
πœ‹βˆˆπ‘ƒπ‘›
𝑙 πœ‹
𝛿 πœ‹
Next, we rewrite the terms
πœ‹π‘–
1 1
1
βˆ’1
2
2
2
=
𝑖
𝑛+𝑙(πœ‹)
βˆ’1
2𝑙(πœ‹)
𝑛
𝑖=1
πœ‹π‘–
1
𝑖
2
1
1
βˆ’2 … βˆ’π‘–+1
2
2
𝑖!
πœ‹π‘–
When we take the product of these terms over i, the
denominator becomes 𝑛𝑖=1 𝑖! πœ‹π‘– , the product of the factorials of
all the parts of πœ‹, which I abbreviate as πœ‹!. Observe that
1
𝑛
= 𝑛!
πœ‹!
πœ‹
Looking more carefully at the numerator, we obtain:
Simplifications, continued
1 1
βˆ’1
2 2
1
1
βˆ’2 …
βˆ’π‘–+1
2
2
πœ‹π‘–
1
1
=
βˆ’
2
2
3
2𝑖 βˆ’ 3
βˆ’ … βˆ’
2
2
πœ‹π‘–
πœ‹π‘–
𝑖
2
We can factor out a power of 2 in the denominator, namely
= 2π‘–πœ‹π‘– ,
and since every factor except the first is negative, we can also factor out a
power of -1, namely
(βˆ’1)π‘–βˆ’1
πœ‹π‘–
= βˆ’1
π‘–πœ‹π‘– βˆ’πœ‹π‘– .
Now when we take the
product over i, this means we factor out the following: in the denominator,
2π‘–πœ‹π‘– = 2 π‘–πœ‹π‘– = 2𝑛
(which cancels part of the 4𝑛 outside the sum), and in the numerator,
(βˆ’1)π‘–πœ‹π‘– βˆ’πœ‹π‘– = (βˆ’1) π‘–πœ‹π‘– βˆ’ πœ‹π‘– = (βˆ’1)π‘›βˆ’π‘™(πœ‹) .
Combined with the (βˆ’1)𝑛+𝑙(πœ‹) term in front of the product, this becomes
(βˆ’1)2𝑛 = 1. In other words, all the negatives cancel out! Finally, what
remains in the square brackets is a product of odd integers, which we
abbreviate with the double factorial notation (with the convention that
(-1)!! = 1). The entire thing simplifies to:
New formula for the Catalan numbers!
β€’ We have proved:
𝑛
2
𝐢𝑛 =
𝑛!
πœ‹βˆˆπ‘ƒπ‘›
𝑛
πœ‹
𝑙 πœ‹
𝛿 πœ‹
𝑛
1
2𝑙(πœ‹)
2𝑖 βˆ’ 3 β€Ό
𝑖=1
Let’s illustrate this with n = 4. We need the table:
𝝅
π…πŸ
π…πŸ
π…πŸ‘
π…πŸ’
𝒍(𝝅)
𝜹(𝝅)
[4]
0
0
0
1
1
[1]
[3,1]
1
0
1
0
2
[12 ]
[22 ]
0
2
0
0
2
[2]
[2, 12 ]
2
1
0
0
3
[2,1]
14
4
0
0
0
4
[4]
πœ‹π‘–
Catalan example (n = 4)
β€’ Our formula becomes:
𝐢4 =
16
=
24
24
4!
πœ‹βˆˆπ‘ƒ4
4
πœ‹
𝑙 πœ‹
𝛿 πœ‹
1
2𝑙(πœ‹)
4
2𝑖 βˆ’ 3 β€Ό
πœ‹π‘–
𝑖=1
4 1 1
4
2 1
1
1+
(5β€Ό) +
(3β€Ό)
4 1 2
3 1 1 1 22
16
4
3 1
4
4
1+
+
(1β€Ό)
24 2 1 1 2 1 23
1111 4
4
2 1
2
(1β€Ό)
2 2 2 22
1
((βˆ’1)β€Ό)4
4
2
16
1
1
1 2
=
1βˆ™1βˆ™ βˆ™ 5βˆ™3βˆ™1 +4β‹…2β‹… β‹… 3β‹…1 +6β‹…1β‹… β‹…1
24
2
4
4
16
1
1
+
12 βˆ™ 3 βˆ™ β‹… 1 + 24 β‹… 1 β‹…
β‹…1
24
8
16
Catalan example (n = 4)
= 5 + 4 + 1 + 3 + 1 = 14
This is the correct value as
𝐢4 =
1 8
5 4
= 14
Of course it appears as if my formula is kind of
useless since it is so inefficient!
Or maybe not.....
The Catalan numbers are known to count many
things – maybe my formula gives some sort of
refinement of this count?
Speculation: Dyck words?
The 14 Dyck words of length 8
AAAABBBB
AAABABBB
AABAABBB
AABABABB
ABAAABBB
ABAABABB
AAABBABB
AAABBBAB
AABABBAB
AABBAABB
AABBABAB
ABAABBAB
ABABAABB
ABABABAB
β€’ I tried many ways to β€˜naturally’ break these up into groups of sizes 5,4,1,3,1
but always without success. But then – what if we lump the terms together
corresponding to partitions of the same length? This leads to groups of size
5,5,3,1 – and such groups DO appear naturally in the table....
I have some ideas on how to do this in general (no proof yet), but I believe that I
can make the individual terms in my sum always correspond to such groups of
Dyck words. Hopefully this will lead to a bijective proof of my formula.



The 2008 paper, which has the explicit formulas
for the ordinary Bernoulli & Euler numbers
(but not the higher order ones), can be
downloaded from this website:
http://www.integers-ejcnt.org/
Just click on the 2008 volume. My paper is the
first one in the January issue.
Appendix: My Bernoulli number formula
β€’ Let’s see how it works for n = 4:
Partitions of 4
[4]
[3,1]
[2,2]
[2,1,1]
[1,1,1,1]
β€’
Length
1
2
2
3
4
β€’
Derived
[1]
[1,1]
[2]
[1,2]
[4]
β€’ B4 =
1
( ο€­1)  1  4 οƒΆ
( ο€­1)
11
1 2


 1 4 οƒ· 
  οƒΈ
( ο€­1)
3
1 3
1
3
2
 3  4 οƒΆ 
 1, 2  1,1, 2 οƒ·
 
οƒΈ
οƒ—1οƒ— 6 ο€­
1
4
οƒ— 3 οƒ— 12 
1
5
 2  4 οƒΆ 
 1,1 1,3 οƒ·
  οƒΈ
( ο€­1)
4
1 4
( ο€­1)
2
1 2
 2  4 οƒΆ
 2  2, 2 οƒ·
  οƒΈ
 4  4 οƒΆ ο€½
 4  1,1,1,1οƒ·
 
οƒΈ
οƒ— 1 οƒ— 24 ο€½
ο€­1
2

8
3
ο€­1
2
2ο€­9

24
5
1
3
οƒ—2οƒ—4
ο€½ο€­
1
30
β€’
Appendix: My second Bernoulli number formula
For example:
(ο€­1)
Bn ο€½ οƒ₯
m! S (n, m)
m ο€½1 1  m
n
m
( ο€­1) m
B4 ο€½ οƒ₯
m! S ( 4, m)
m ο€½1 1  m
ο€­1
1
ο€­1
1
ο€½
1!οƒ—1  2!οƒ—7 
3!οƒ—6  4!οƒ—1
2
3
4
5
1 14
24
1
ο€½ο€­ 
ο€­9
ο€½ο€­
2
3
5
30
4
Appendix: My higher order
Bernoulli number formula
ο‚— (Vella, Feb., 2008 - unpublished):
B ο€½
w
n
οƒ₯

οƒŽPn
 ( ) ο‚£ w
w
(  ( ))
n
οƒ— S οƒ—  Bi 
i
i ο€½1
which expresses the higher order Bernoulli numbers in
terms of the ordinary ones. Here, 𝑀 (π‘š) is the falling
factorial function 𝑀 (π‘š) = 𝑀 𝑀 βˆ’ 1 𝑀 βˆ’ 2 … (𝑀 βˆ’ π‘š + 1)
Appendix: Example of Higher Order Bernoulli formula
β€’ For example, let’s compute B42. There are 5 partitions of 4,
but only three of them have length at most 2: [4], [3,1] and
[2,2]:
B 
B2  B3  B4 
1
0
1
0
( 2)
2
οƒ— S[1, 3] οƒ— B1  B2  B3  B4  
0
2
0
0
( 2)
2
οƒ— S[ 2 , 2 ] οƒ— B1  B2  B3  B4  
2
ο€½ 2 οƒ—1 οƒ— B4  2 οƒ—1 οƒ— 4 οƒ— 0  2 οƒ—1 οƒ— 3 οƒ— B2 
2
4
B
ο€½2
(1)
οƒ— S[ 4 ] οƒ—
ο€½ 2 B4  6B2 
2
0
0
0
1
1
 ο€­1 οƒΆ
1οƒΆ
ο€½ 2
οƒ·  6 οƒ·
 30 οƒΈ
6οƒΈ
1
1
1
ο€½ο€­

ο€½
.
15
6
10
2
ο€½
