Lambert series
In mathematics, a Lambert series, named for Johann Heinrich Lambert, is a series taking the form
It can be resummed formally by expanding the denominator:
where the coefficients of the new series are given by the Dirichlet convolution of an with the constant function 1 = 1:
This series may be inverted by means of the Möbius inversion formula, and is an example of a Möbius transform.
Examples
Since this last sum is a typical number-theoretic sum, almost any natural multiplicative function will be exactly summable when used in a Lambert series. Thus, for example, one haswhere is the number of positive divisors of the number n.
For the higher order sum-of-divisor functions, one has
where is any complex number and
is the divisor function.
Additional Lambert series related to the previous identity include those for the variants of the
Möbius function given below
Related Lambert series over the Moebius function include the following identities for any
prime :
The proof of the first identity above follows from a multi-section identity of these
Lambert series generating functions in the following form where we denote
to be the Lambert series generating function of the arithmetic function f:
The second identity in the previous equations follows from the fact that the coefficients of the left-hand-side sum are given by
where the function is the multiplicative identity with respect to the operation of Dirichlet convolution of arithmetic functions.
For Euler's totient function :
For Von Mangoldt function :
For Liouville's function :
with the sum on the right similar to the Ramanujan theta function, or Jacobi theta function. Note that Lambert series in which the an are trigonometric functions, for example, an = sin, can be evaluated by various combinations of the logarithmic derivatives of Jacobi theta functions.
Generally speaking, we can extend the previous generating function expansion by letting denote the characteristic function of the powers,, for positive natural numbers and defining the generalized m-Liouville lambda function to be the arithmetic function satisfying. This definition of clearly implies that, which in turn shows that
We also have a slightly more generalized Lambert series expansion generating the sum of squares function in the form of
In general, if we write the Lambert series over which generates the arithmetic functions, the next pairs of functions correspond to other well-known convolutions expressed by their Lambert series generating functions in the forms of
where is the multiplicative identity for Dirichlet convolutions, is the identity function for powers, denotes the characteristic function for the squares, which counts the number of distinct prime factors of , is Jordan's totient function, and is the divisor function.
The conventional use of the letter q in the summations is a historical usage, referring to its origins in the theory of elliptic curves and theta functions, as the nome.
Alternate form
Substituting one obtains another common form for the series, aswhere
as before. Examples of Lambert series in this form, with, occur in expressions for the Riemann zeta function for odd integer values; see Zeta constants for details.
Current usage
In the literature we find Lambert series applied to a wide variety of sums. For example, since is a polylogarithm function, we may refer to any sum of the formas a Lambert series, assuming that the parameters are suitably restricted. Thus
which holds for all complex q not on the unit circle, would be considered a Lambert series identity. This identity follows in a straightforward fashion from some identities published by the Indian mathematician S. Ramanujan. A very thorough exploration of Ramanujan's works can be found in the works by Bruce Berndt.
Factorization theorems
A somewhat newer construction recently published over 2017–2018 relates to so-termed Lambert series factorization theorems of the formwhere is the respective sum or difference of the
restricted partition functions which denote the number of 's in all partitions of into an even number of distinct parts. Let denote the invertible lower triangular sequence whose first few values are shown in the table below.
| n \ k | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
| 1 | 1 | 0 | 0 | 0 | 0 | 0 | 0 | 0 |
| 2 | 0 | 1 | 0 | 0 | 0 | 0 | 0 | 0 |
| 3 | -1 | -1 | 1 | 0 | 0 | 0 | 0 | 0 |
| 4 | -1 | 0 | -1 | 1 | 0 | 0 | 0 | 0 |
| 5 | -1 | -1 | -1 | -1 | 1 | 0 | 0 | 0 |
| 6 | 0 | 0 | 1 | -1 | -1 | 1 | 0 | 0 |
| 7 | 0 | 0 | -1 | 0 | -1 | -1 | 1 | 0 |
| 8 | 1 | 0 | 0 | 1 | 0 | -1 | -1 | 1 |
Another characteristic form of the Lambert series factorization theorem expansions is given by
where is the q-Pochhammer symbol. The invertible matrix products on the right-hand-side of the previous equation correspond to inverse matrix products whose lower triangular entries are given in terms of the partition function and the Möbius function by the divisor sums
The next table lists the first several rows of these corresponding inverse matrices.
| n \ k | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
| 1 | 1 | 0 | 0 | 0 | 0 | 0 | 0 | 0 |
| 2 | 0 | 1 | 0 | 0 | 0 | 0 | 0 | 0 |
| 3 | 1 | 1 | 1 | 0 | 0 | 0 | 0 | 0 |
| 4 | 2 | 1 | 1 | 1 | 0 | 0 | 0 | 0 |
| 5 | 4 | 3 | 2 | 1 | 1 | 0 | 0 | 0 |
| 6 | 5 | 3 | 2 | 2 | 1 | 1 | 0 | 0 |
| 7 | 10 | 7 | 5 | 3 | 2 | 1 | 1 | 0 |
| 8 | 12 | 9 | 6 | 4 | 3 | 2 | 1 | 1 |
We let denote the sequence of interleaved pentagonal numbers, i.e., so that the pentagonal number theorem is expanded in the form of
Then for any Lambert series generating the sequence of, we have the corresponding inversion relation of the factorization theorem expanded above given by
This work on Lambert series factorization theorems is extended in to more general expansions of the form
where is any reciprocal generating function, is any arithmetic function, and where the
modified coefficients are expanded by
The corresponding inverse matrices in the above expansion satisfy
so that as in the first variant of the Lambert factorization theorem above we obtain an inversion relation for the right-hand-side coefficients of the form
Recurrence relations
Within this section we define the following functions for natural numbers :We also adopt the notation from the previous section that
where is the infinite q-Pochhammer symbol. Then we have the following recurrence relations for involving these functions and the pentagonal numbers proved in:
Derivatives
Derivatives of a Lambert series can be obtained by differentiation of the series termwise with respect to. We have the following identities for the termwise derivatives of a Lambert series for anywhere the bracketed triangular coefficients in the previous equations denote the Stirling numbers of the first and second kinds.
We also have the next identity for extracting the individual coefficients of the terms implicit to the previous expansions given in the form of
Now if we define the functions for any by
where denotes Iverson's convention, then we have the coefficients for the derivatives of a Lambert series
given by
Of course, by a typical argument purely by operations on formal power series we also have that