Introduction
I want to talk about one of the many pretty areas of number theory. This involves the notion of an
arithmetic function and related concepts. A few relatively simple concepts will allow us to produce
a variety of useful functions and theorems. This provides only a glimpse of the start of the
field of analytic number theory, though many of these techniques are used in other places as we’ll
also start to see.
(See the end for a summary of identities and results.)
Prelude
As some notation, I’ll write |\mathbb N_+| for the set of positive naturals, and |\mathbb P| for
the set of primes. |\mathbb N| will contain |0|. Slightly atypically, I’ll write |[n]| for the set
of numbers from |1| to |n| inclusive, i.e. |a \in [n]| if and only if |1 \leq a \leq n|.
I find that the easiest way to see results in number theory
is to view a positive natural number as a multiset of primes which is uniquely given by
factorization. Coprime numbers are ones where these multisets are disjoint. Multiplication unions
the multisets. The greatest common divisor is multiset intersection. |n| divides |m| if and only
if |n| corresponds to a sub-multiset of |m|, in which case |m/n| corresponds to the multiset
difference. The multiplicity of an element of a multiset is the number of occurrences.
For a multiset |P|, |\mathrm{dom}(P)| is the set of elements of the multiset |P|, i.e. those
with multiplicity greater than |0|. For a finite multiset |P|, |\vert P\vert| will be the sum of
the multiplicities of the distinct elements, i.e. the number of elements (with duplicates) in the
multiset.
We can represent a multiset of primes as a function |\mathbb P \to \mathbb N| which maps an
element to its multiplicity. A finite multiset would then be such a function that is |0| at all
but finitely many primes. Alternatively, we can represent the multiset as a partial function
|\mathbb P \rightharpoonup \mathbb N_+|. It will be finite when it is defined for only finitely
many primes. Equivalently, when it is a finite subset of |\mathbb P\times\mathbb N_+| (which is
also a functional relation).
Unique factorization provides a bijection between finite multisets of primes and positive natural
numbers. Given a finite multiset |P|, the corresponding positive natural number is
|n_P = \prod_{(p, k) \in P} p^k|.
I will refer to this view often in the following.
Arithmetic Functions
An arithmetic function is just a function
defined on the positive naturals. Usually, they’ll land in (not necessarily positive) natural
numbers, but that isn’t required.
In most cases, we’ll be interested in the specific subclass of multiplicative arithmetic functions.
An arithmetic function, |f|, is multiplicative if |f(1) = 1| and |f(ab) = f(a)f(b)| whenever
|a| and |b| are coprime. We also have the notion of a completely multiplicative arithmetic
function for which |f(ab) = f(a)f(b)| always. Obviously, completely multiplicative functions are
multiplicative. Analogously, we also have a notion of (completely) additive where
|f(ab) = f(a) + f(b)|. Warning: In other mathematical contexts, “additive” means |f(a+b)=f(a)+f(b)|.
An obvious example of a completely additive function being the logarithm. Exponentiating an additive
function will produce a multiplicative function.
For an additive function, |f|, we automatically get |f(1) = 0| since |f(1) = f(1\cdot 1) = f(1) + f(1)|.
Lemma: The product of two multiplicative functions |f| and |g| is multiplicative.
Proof: For |a| and |b| coprime, |f(ab)g(ab) = f(a)f(b)g(a)g(b) = f(a)g(a)f(b)g(b)|. |\square|
A parallel statement holds for completely multiplicative functions.
It’s also clear that a completely multiplicative function is entirely determined by its action on
prime numbers. Since |p^n| is coprime to |q^n| whenever |p| and |q| are coprime, we see
that a multiplicative function is entirely determined by its action on powers of primes. To this
end, I’ll often define multiplicative/additive functions by their action on prime powers and
completely multiplicative/additive functions by their action on primes.
Multiplicative functions aren’t closed under composition, but we do have that if |f| is completely
multiplicative and |g| is multiplicative, then |f \circ g| is multiplicative when that composite
makes sense.
Here are some examples. Not all of these will be used in the sequel.
- The power function |({-})^z| for any |z|, not necessarily an integer, is completely multiplicative.
- Choosing |z=0| in the previous, we see the constantly one function |\bar 1(n) = 1| is completely
multiplicative.
- The identity function is clearly completely multiplicative and is also the |z=1| case of the above.
- The Kronecker delta function |\delta(n) = \begin{cases}1, & n = 0 \\ 0, & n \neq 0\end{cases}|
is completely multiplicative. Often written |\varepsilon| in this context.
- Define a multiplicative function via |\mu(p^n) = \begin{cases} -1, & n = 1 \\ 0, & n > 1\end{cases}|
where |p| is prime. This is the Möbius function.
More holistically, |\mu(n)| is |0| if |n| has any square factors, otherwise |\mu(n) = (-1)^k|
where |k| is the number of (distinct) prime factors.
- Define a completely multiplicative function via |\lambda(p) = -1|. |\lambda(n) = \pm 1|
depending on whether there is an even or odd number of prime factors (including duplicates).
This function is known as the Liouville function.
- |\lambda(n) = (-1)^{\Omega(n)}| where |\Omega(n)| is the completely additive function which
counts the number of prime factors of |n| including duplicates. |\Omega(n_P) = \vert P\vert|.
- Define a multiplicative function via |\gamma(p^n) = -1|. |\gamma(n) = \pm 1| depending on
whether there is an even or odd number of distinct prime factors.
- |\gamma(n) = (-1)^{\omega(n)}| where |\omega(n)| is the additive function which counts the
number of distinct prime factors of |n|. See Prime omega function.
We also see that |\omega(n_P) = \vert\mathrm{dom}(P)\vert|.
- The completely additive function for |q\in\mathbb P|, |\nu_q(p) = \begin{cases}1,&p=q\\0,&p\neq q\end{cases}|
is the p-adic valuation.
- It follows that the |p|-adic absolute value |\vert r\vert_p = p^{-\nu_p(r)}| is completely
multiplicative. It can be characterized on naturals by
|\vert p\vert_q = \begin{cases}p^{-1},&p=q\\1,&p\neq q\end{cases}|.
- |\gcd({-}, k)| for a fixed |k| is multiplicative. Given any multiplicative function |f|,
|f \circ \gcd({-},k)| is multiplicative. This essentially “restricts” |f| to only see the prime
powers that divide |k|. Viewing the finite multiset of primes |P| as a function |\mathbb P\to\mathbb N|,
|f(\gcd(p^n,n_P)) = \begin{cases}f(p^n),&n\leq P(p)\\f(p^{P(p)}),&n>P(p)\end{cases}|.
- The multiplicative function characterized by |a(p^n) = p(n)| where |p(n)| is the partition function
counts the number of abelian groups the given order. That this function is multiplicative is a
consequence of the fundamental theorem of finite abelian groups.
- The Jacobi symbol |\left(\frac{a}{n}\right)|
where |a\in\mathbb Z| and |n| is an odd positive integer is a completely multiplicative
function with either |a| or |n| fixed. When |n| is an odd prime, it reduces to the
Legendre symbol. For |p| an odd prime, we have
|(\frac{a}{p}) = a^{\frac{p-1}{2}} \pmod p|. This will always be in
|\{-1, 0, 1\}| and can be alternately defined as
|\left(\frac{a}{p}\right) = \begin{cases}0,&p\mid a\\1,&p\nmid a\text{ and }\exists x.x^2\equiv a\pmod p\\-1,&\not\exists x.x^2\equiv a\pmod p\end{cases}|.
Therefore, |\left(\frac{a}{p}\right)=1| (|=0|) when |a| is a (trivial) quadratic residue
mod |p|.
- An interesting example which is not multiplicative nor additive is the arithmetic derivative.
Let |p\in\mathbb P|. Define |\frac{\partial}{\partial p}(n)| via |\frac{\partial}{\partial p}(p) = 1|,
|\frac{\partial}{\partial p}(q) = 0| for |q\neq p| and |q\in\mathbb P|, and
|\frac{\partial}{\partial p}(nm) = \frac{\partial}{\partial p}(n)m + n\frac{\partial}{\partial p}(m)|.
We then have |D_S = \sum_{p\in S}\frac{\partial}{\partial p}| for non-empty |S\subseteq\mathbb P|
which satisfies the same product rule identity. This perspective views a natural number (or, more
generally, a rational number) as a monomial in infinitely many variables labeled by prime numbers.
- A Dirichlet character of modulus |m| is,
by definition, a completely multiplicative function |\chi| satisfying |\chi(n + m) = \chi(n)|
and |\chi(n)| is non-zero if and only if |n| is coprime to |m|. The Jacobi symbol
|\left(\frac{({-})}{m}\right)| is a Dirichlet character of modulus |m|. |\bar 1| is the
Dirichlet character of modulus |1|.
Dirichlet Series
Given an arithmetic function |f|, we define the Dirichlet series:
\[\mathcal D[f](s) = \sum_{n=1}^\infty \frac{f(n)}{n^s} = \sum_{n=1}^\infty f(n)n^{-s}\]
When |f| is a Dirichlet character, |\chi|, this is referred to as the (Dirichlet) |L|-series
of the character, and the analytic continuation is the (Dirichlet) |L|-function and is written
|L(s, \chi)|.
We’ll not focus much on when such a series converges. See this section
of the above Wikipedia article for more details. Alternatively, we could talk about
formal Dirichlet series.
We can clearly see that if |s = 0|, then we get
the sum |\sum_{n=1}^\infty f(n)| which clearly won’t converge for, say, |f = \bar 1|. We can say
that if |f| is asymptotically bounded by |n^k| for some |k|, i.e. |f \in O(n^k)|, then the series
will converge absolutely when the real part of |s| is greater than |k+1|. For |\bar 1|, it follows
that |\mathcal D[\bar 1](x + iy)| is defined when |x > 1|. We can use analytic continuation
to go beyond these limits.
See A Catalog of Interesting Dirichlet Series
for a more reference-like listing. Beware differences in notation.
Dirichlet Convolution
Why is this interesting in this context? Let’s consider two arithmetic functions |f| and |g| and
multiply their corresponding Dirichlet series. We’ll get:
\[\mathcal D[f](s)\mathcal D[g](s) = \sum_{n=1}^\infty h(n)n^{-s} = \mathcal D[h](s)\]
where now we need to figure out what |h(n)| is. But |h(n)| is going to be the sum of all the terms
of the form |f(a)a^{-s}g(b)b^{-s} = f(a)g(b)(ab)^{-s}| where |ab = n|. We can thus write:
\[h(n) = \sum_{ab=n} f(a)g(b) = \sum_{d\mid n} f(d)g(n/d)\] We’ll write this more compactly as
|h = f \star g| which we’ll call Dirichlet convolution.
We have thus shown a convolution theorem of the form
\[\mathcal D[f]\mathcal D[g] = \mathcal D[f \star g]\]
The Kronecker delta serves as a unit to this operation which is reflected by
|\mathcal D[\delta](s) = 1|.
In the same way we can view a sum of the form |\sum_{a+b=n}f(a)g(b)| that arises in “normal”
convolution as a sum along the line |y = n - x|, we can view the sum |\sum_{ab=n}f(a)g(b)| as
a sum along a hyperbola of the form |y = n/x|. For all of
|\sum_{n=1}^\infty\sum_{k=1}^\infty f(n)g(k)|, |\sum_{n=1}^\infty\sum_{k=1}^n f(k)g(n-k)|,
and |\sum_{n=1}^\infty\sum_{k\mid n}f(k)g(n/k)| we’re including |f(a)g(b)| for every
|(a,b)\in\mathbb N_+\times\mathbb N_+| in the sum exactly once. The difference is whether
we’re grouping the internal sum by rows, diagonals, or hyperbolas. This idea of summing hyperbolas
can be expanded to a computational technique for sums of multiplicative functions called the
Dirichlet hyperbola method.
Since we will primarily be interested in multiplicative functions, we should check that
|f \star g| is a multiplicative function when |f| and |g| are.
Lemma: Assume |a| and |b| are coprime, and |f| and |g| are multiplicative. Then
|(f \star g)(ab) = (f \star g)(a)(f \star g)(b)|.
Proof: Since |a| and |b| are coprime, they share no divisors besides |1|. This means every |d|
such that |d \mid ab| factors as |d = d_a d_b| where |d_a \mid a| and |d_b \mid b|. More
strongly, write |D_n = \{ d \in \mathbb N_+ \mid d \mid n\}|, then for any coprime pair of
numbers |i| and |j|, we have |D_{ij} \cong D_i \times D_j| and that every pair
|(d_i, d_j) \in D_i \times D_j| are coprime. Thus,
\[\begin{flalign}
(f \star g)(ab)
& = \sum_{d \in D_{ab}} f(d)g((ab)/d) \tag{by definition} \\
& = \sum_{(d_a, d_b) \in D_a \times D_b} f(d_a d_b)g((ab)/(d_a d_b)) \tag{via the bijection} \\
& = \sum_{(d_a, d_b) \in D_a \times D_b} f(d_a)f(d_b)g(a/d_a)g(b/d_b) \tag{f and g are multiplicative} \\
& = \sum_{d_a \in D_a} \sum_{d_b \in D_b} f(d_a)f(d_b)g(a/d_a)g(b/d_b) \tag{sum over a Cartesian product} \\
& = \sum_{d_a \in D_a} f(d_a)g(a/d_a) \sum_{d_b \in D_b} f(d_b)g(b/d_b) \tag{undistributing} \\
& = \sum_{d_a \in D_a} f(d_a)g(a/d_a) (f \star g)(b) \tag{by definition} \\
& = (f \star g)(b) \sum_{d_a \in D_a} f(d_a)g(a/d_a) \tag{undistributing} \\
& = (f \star g)(b) (f \star g)(a) \tag{by definition} \\
& = (f \star g)(a) (f \star g)(b) \tag{commutativity of multiplication}
\end{flalign}\] |\square|
It is not the case that the Dirichlet convolution of two completely multiplicative functions is
completely multiplicative.
We can already start to do some interesting things with this. First, we see that
|\mathcal D[\bar 1] = \zeta|, the Riemann zeta function.
Now consider |(\bar 1 \star \bar 1)(n) = \sum_{k \mid n} 1 = d(n)|.
|d(n)| is the divisor function
which counts the number of divisors of |n|. We see that
|\mathcal D[d](s) = \zeta(s)^2|. A simple but useful fact is
|\zeta(s - z) = \mathcal D[(-)^z](s)|. This directly generalizes the result for
|\mathcal D[\bar 1]| and also implies |\mathcal D[\operatorname{id}](s) = \zeta(s - 1)|.
Generalizing in a different way, we get the family of functions
|\sigma_k = ({-})^k \star \bar 1|. |\sigma_k(n) = \sum_{d \mid n} d^k|.
From the above, we see |\mathcal D[\sigma_k](s) = \zeta(s - k)\zeta(s)|.
Lemma: Given a completely multiplicative function |f|,
we get |f(n)(g \star h)(n) = (fg \star fh)(n)|.
Proof: \[\begin{flalign}
(fg \star fh)(n)
& = \sum_{d \mid n} f(d)g(d)f(n/d)h(n/d) \\
& = \sum_{d \mid n} f(d)f(n/d)g(d)h(n/d) \\
& = \sum_{d \mid n} f(n)g(d)h(n/d) \\
& = f(n)\sum_{d \mid n} g(d)h(n/d) \\
& = f(n)(g \star h)(n)
\end{flalign}\]
|\square|
As a simple corollary, for a completely multiplicative |f|,
|f \star f = f(\bar 1 \star \bar 1) = fd|.
However, the true power of this is unlocked by the following theorem:
Theorem (Euler product formula):
Given a multiplicative function |f| which doesn’t grow too fast, e.g. is |O(n^k)| for some |k > 0|,
\[\mathcal D[f](s)
= \sum_{n=1}^\infty f(n)n^{-s}
= \prod_{p \in \mathbb P}\sum_{n=0}^\infty f(p^n)p^{-ns}
= \prod_{p \in \mathbb P}\left(1 + \sum_{n=1}^\infty f(p^n)p^{-ns}\right)
\]
where the series converges.
Proof: The last equality is simply using the fact that |f(p^0)p^0 = f(1) = 1| because |f| is
multiplicative. The idea for the main part is similar to how we derived Dirichlet convolution.
When we start to distribute out the infinite product, each term will correspond to the product of
selections of a term from each series. When all but finitely many of those selections select the |1|
term, we get |\prod_{(p, k) \in P}f(p^k)(p^k)^{-s}| where |P| is some finite multiset of
primes induced by those selections. Therefore,
|\prod_{(p, k) \in P}f(p^k)(p^k)^{-s} = f(n_P)n_P^{-s}|. Thus, by unique factorization,
|f(n)n^{-s}| for every positive natural occurs in the sum produced by distributing the right-hand
side exactly once.
In the case where |P| is not a finite multiset, we’ll have \[
\frac{\prod_{(p, k) \in P}f(p^k)}{\left(\prod_{(p, k) \in P}p^k\right)^s}\]
The denominator of this expression goes to infinity when the real part of |s| is greater than |0|.
As long as the numerator doesn’t grow faster than the denominator (perhaps after restricting the
real part of |s| to be greater than some bound), then this product goes to |0|. Therefore, the only
terms that remain are these corresponding to the Dirichlet series on the left-hand side. |\square|
If we assume |f| is completely multiplicative, we can further simplify Euler’s product formula
via the usual sum of a geometric series, |\sum_{n=0}^\infty x^n = (1-x)^{-1}|, to:
\[
\sum_{n=1}^\infty f(n)n^{-s}
= \prod_{p \in \mathbb P}\sum_{n=0}^\infty (f(p)p^{-s})^n
= \prod_{p \in \mathbb P}(1 - f(p)p^{-s})^{-1}
\]
Now let’s put this to work. The first thing we can see is
|\zeta(s) = \mathcal D[\bar 1](s) = \prod_{p\in\mathbb P}(1 - p^{-s})^{-1}|. But this lets
us write |1/\zeta(s) = \prod_{p\in\mathbb P}(1 - p^{-s})|.
If we look for a multiplicative function that would produce the right-hand side, we see that it must
send a prime |p| to |-1| and |p^n| for |n > 1| to |0|. In other words, it’s the Möbius function
|\mu| we defined before. So |\mathcal D[\mu](s) = 1/\zeta(s)|.
Using |\mathcal D[d](s) = \zeta(s)^2|, we see that
\[\begin{flalign}
\zeta(s)^2
& = \prod_{p\in\mathbb P}\left(\sum_{n=0}^\infty p^{-ns}\right)^{-2} \\
& = \prod_{p\in\mathbb P}\left(\sum_{n=0}^\infty (n+1)p^{-ns}\right)^{-1} \\
& = \prod_{p\in\mathbb P}\left(\sum_{n=0}^\infty d(p^n)p^{-ns}\right)^{-1} \\
& = \mathcal D[d](s)
\end{flalign}\]
Therefore, |d(p^n) = n + 1|. This intuitively makes sense because the only divisors of |p^n| are
|p^k| for |k = 0, \dots, n|, and for |a| and |b| coprime
|d(ab) = \vert D_{ab} \vert = \vert D_a \times D_b\vert = \vert D_a\vert\vert D_b\vert = d(a)d(b)|.
Another result leveraging the theorem is given any multiplicative function |f|, we can define a new
multiplicative function via
|f^{[k]}(p^n) = \begin{cases}f(p^m), & km = n\textrm{ for }m\in\mathbb N \\ 0, & k \nmid n\end{cases}|.
Lemma: The operation just defined has the property that
|\mathcal D[f^{[k]}](s) = \mathcal D[f](ks)|.
Proof:
\[\begin{flalign}
\mathcal D[f^{[k]}](s)
& = \prod_{p \in \mathbb P}\sum_{n=0}^\infty f^{[k]}(p^n)p^{-ns} \\
& = \prod_{p \in \mathbb P}\sum_{n=0}^\infty f^{[k]}(p^{kn})p^{-nks} \\
& = \prod_{p \in \mathbb P}\sum_{n=0}^\infty f(p^n)p^{-nks} \\
& = \mathcal D[f](ks)
\end{flalign}\]
|\square|
Möbius Inversion
We can write a sum over some function, |f|, of the divisors of a given natural |n| as
|(f \star \bar 1)(n) = \sum_{d \mid n} f(d)|. Call this |g(n)|. But then we have
|\mathcal D[f \star \bar 1] = \mathcal D[f]\mathcal D[\bar 1] = \mathcal D[f]\zeta| and thus
|\mathcal D[f] = \mathcal D[f]\zeta/\zeta = \mathcal D[(f \star \bar 1) \star \mu]|.
Therefore, if we only have the sums |g(n) = \sum_{d \mid n} f(d)| for some unknown |f|, we can
recover |f| via |f(n) = (g \star \mu)(n) = \sum_{d\mid n}g(d)\mu(n/d)|.
This is Möbius inversion.
Formally:
\[g(n) = \sum_{d\mid n} f(d) \iff f(n) = \sum_{d \mid n} \mu(d)g(n/d)\]
As a simple example, we clearly have |\zeta(s)/\zeta(s) = 1 = \mathcal D[\delta](s)| so
|\bar 1 \star \mu = \delta| or |\sum_{d \mid n}\mu(d) = 0| for |n > 1| and |1| when |n = 1|.
We also get generalized Möbius inversion via
|\delta(n) = \delta(n)n^k = (\mu\star\bar 1)(n)n^k = (({-})^k\mu\star({-})^k)(n)|. Which
is to say if |g(n) = \sum_{d\mid n}d^k f(n/d)| then |f(n) = \sum_{d\mid n} \mu(d)d^kg(n/d)|.
By considering logarithms, we also get a multiplicative form of (generalized) Möbius inversion:
\[g(n) = \prod_{d\mid n}f(n/d)^{d^k} \iff f(n) = \prod_{d\mid n}g(n/d)^{\mu(d)d^k}\]
Theorem: As another guise of Möbius inversion, given any completely multiplicative function |h|,
let |g(m) = \sum_{n=1}^\infty f(mh(n))|. Assuming these sums make sense, we can recover |f(k)|
via |f(k) = \sum_{m=1}^\infty \mu(m)g(kh(m))|.
Proof:
\[\begin{align}
\sum_{m=1}^\infty \mu(m)g(kh(m))
& = \sum_{m=1}^\infty \mu(m)\sum_{n=1}^\infty f(kh(m)h(n)) \\
& = \sum_{N=1}^\infty \sum_{N=mn} \mu(m)f(kh(N)) \\
& = \sum_{N=1}^\infty f(kh(N)) \sum_{N=nm} \mu(m) \\
& = \sum_{N=1}^\infty f(kh(N)) (\mu\star\bar 1)(N) \\
& = \sum_{N=1}^\infty f(kh(N)) \delta(N) \\
& = f(k)
\end{align}\] |\square|
This will often show up in the form of |r(x^{1/n})| or |r(x^{1/n})/n|, i.e. with |h(n)=n^{-1}|
and |f_x(k) = r(x^k)| or |f_x(k) = kr(x^k)|. Typically, we’ll then be computing
|f_x(1) = r(x)|.
Lambert Series
As a brief aside, it’s worth mentioning Lambert Series.
Given an arithmetic function |a|, these are series of the form:
\[
\sum_{n=1}^\infty a(n) \frac{x^n}{1-x^n}
= \sum_{n=1}^\infty a(n) \sum_{k=1}^\infty x^{kn}
= \sum_{n=1}^\infty (a \star \bar 1)(n) x^n
\]
This leads to:
\[\sum_{n=1}^\infty \mu(n) \frac{x^n}{1-x^n} = x\]
and:
\[\sum_{n=1}^\infty \varphi(n) \frac{x^n}{1-x^n} = \frac{x}{(1-x)^2}\]
Inclusion-Exclusion
The Möbius and |\zeta| functions can be generalized to
incidence algebras where this form is from the
incidence algebra induced by the divisibility order.
A notable and relevant example of a Möbius
functions for another, closely related, incidence algebra is when we consider the incidence algebra
induced by finite multisets with the inclusion ordering. Let |T| be a finite multiset, we get
|\mu(T) = \begin{cases}0,&T\text{ has repeated elements}\\(-1)^{\vert T\vert},&T\text{ is a set}\end{cases}|.
Since we can view a natural number as a finite multiset of primes, and we can always relabel the
elements of a finite multiset with distinct primes, this is equivalent to the Möbius function we’ve
been using.
This leads to a nice and compact way of describing the principle of inclusion-exclusion.
Let |A| and |S| be (finite) multisets with |S \subseteq A| and assume we have |f| and |g| defined
on the set of sub-multisets of |A|. If \[g(A) = \sum_{S\subseteq A} f(S)\] then
\[f(A) = \sum_{S\subseteq A}\mu(A\setminus S)g(S)\] and this is Möbius inversion for this
notion of Möbius function. We can thus take a different perspective on Möbius inversion. If
|P| is a finite multiset of primes, then
\[g(n_P) = \sum_{Q\subseteq P}f(n_Q) \iff f(n_P) = \sum_{Q\subseteq P}\mu(P\setminus Q)g(n_Q)\]
recalling that |Q\subseteq P \iff n_Q \mid n_P| and |n_{P\setminus Q} = n_P/n_Q| when
|Q\subseteq P|.
We get traditional inclusion-exclusion by noting that |\mu(T)=(-1)^{\vert T\vert}| when |T| is a
set, i.e. all elements have multiplicity at most |1|. Let |I| be a finite set and assume we have a
family of finite sets, |\{T_i\}_{i\in I}|. Write |T = \bigcup_{i\in I}T_i| and define
|\bigcap_{i\in\varnothing}T_i = T|.
Define
\[f(J) = \left\vert\bigcap_{i\in I\setminus J}T_i\setminus\bigcup_{i \in J}T_i\right\vert\]
for |J\subseteq I|. In particular, |f(I) = 0|.
|f(J)| is then the number of elements shared by all |T_i| for |i\notin J| and no |T_j| for
|j\in J|. Every |x \in \bigcup_{i\in I}T_i| is thus associated to exactly one such subset
of |I|, namely |\{j\in I\mid x\notin T_j\}|. Formally,
|x \in \bigcap_{i\in I\setminus J}T_i\setminus\bigcup_{i \in J}T_i \iff J = \{j\in I\mid x\notin T_j\}|
so each |\bigcap_{i\in I\setminus J}T_i\setminus\bigcup_{i \in J}T_i| is disjoint and
\[g(J)
= \sum_{S\subseteq J}f(S)
= \left\vert\bigcup_{S\subseteq J}\left(\bigcap_{i\in I\setminus S}T_i\setminus\bigcup_{i \in S}T_i\right)\right\vert
= \left\vert\bigcap_{i\in I\setminus J}T_i\right\vert
\]
for |J \subseteq I|. In particular, |g(I) = \vert\bigcup_{i\in I}T_i\vert|.
By the Möbius inversion formula for finite sets, we thus have:
\[f(J) = \sum_{S\subseteq J}(-1)^{\vert J\vert - \vert S\vert}g(S)\]
which for |J = I| gives:
\[
0
= \sum_{J\subseteq I}(-1)^{\vert I\vert - \vert J\vert}\left\vert\bigcap_{i\in I\setminus J}T_i\right\vert
= \left\vert\bigcup_{i\in I}T_i\right\vert + \sum_{J\subsetneq I}(-1)^{\vert I\vert - \vert J\vert}\left\vert\bigcap_{i\in I\setminus J}T_i\right\vert
\]
which is equivalent to the more usual form:
\[\left\vert\bigcup_{i\in I}T_i\right\vert
= \sum_{J\subsetneq I}(-1)^{\vert I\vert - \vert J\vert - 1}\left\vert\bigcap_{i\in I\setminus J}T_i\right\vert
= \sum_{\varnothing\neq J\subseteq I}(-1)^{\vert J\vert + 1}\left\vert\bigcap_{i\in J}T_i\right\vert
\]
|\varphi|
An obvious thing to explore is to apply Möbius inversion to various arithmetic functions.
A fairly natural first start is applying Möbius inversion to the identity function. From the above
results, we know that this unknown function |\varphi| will satisfy
|\mathcal D[\varphi](s) = \zeta(s-1)/\zeta(s) = \mathcal D[\operatorname{id}\star\mu](s)|.
We also immediately have the property that |n = \sum_{d \mid n}\varphi(d)|. Using Euler’s
product formula we have:
\[\begin{flalign}
\zeta(s-1)/\zeta(s)
& = \prod_{p \in \mathbb P} \frac{1 - p^{-s}}{1 - p^{-s+1}} \\
& = \prod_{p \in \mathbb P} \frac{1 - p^{-s}}{1 - pp^{-s}} \\
& = \prod_{p \in \mathbb P} (1 - p^{-s})\sum_{n=0}^\infty p^n p^{-ns} \\
& = \prod_{p \in \mathbb P} \left(\sum_{n=0}^\infty p^n p^{-ns}\right) - \left(\sum_{n=0}^\infty p^n p^{-s} p^{-ns}\right) \\
& = \prod_{p \in \mathbb P} \left(\sum_{n=0}^\infty p^n p^{-ns}\right) - \left(\sum_{n=0}^\infty p^n p^{-(n + 1)s}\right) \\
& = \prod_{p \in \mathbb P} \left(1 + \sum_{n=1}^\infty p^n p^{-ns}\right) - \left(\sum_{n=1}^\infty p^{n-1} p^{-ns}\right) \\
& = \prod_{p \in \mathbb P} \left(1 + \sum_{n=1}^\infty (p^n - p^{n-1}) p^{-ns}\right) \\
& = \prod_{p \in \mathbb P} \left(1 + \sum_{n=1}^\infty \varphi(p^n) p^{-ns}\right) \\
& = \mathcal D[\varphi](s)
\end{flalign}\]
So |\varphi| is the multiplicative function defined by |\varphi(p^n) = p^n - p^{n-1}|.
For |p^n|, we can see that this counts the number of positive integers less than or equal to |p^n|
which are coprime to |p^n|. There are |p^n| positive integers less than or equal to |p^n|, and
every |p|th one is a multiple of |p| so |p^n/p = p^{n-1}| are not coprime to |p^n|. All the
remainder are coprime to |p^n| since they don’t have |p| in their prime factorizations and |p^n|
only has |p| in its. We need to verify that this interpretation is multiplicative. To be clear, we
know that |\varphi| is multiplicative and that this interpretation works for |p^n|. The question
is whether |\varphi(n)| for general |n| meets the above description, i.e. whether the number of
coprime numbers less than |n| is multiplicative.
Theorem: The number of coprime numbers less than |n| is multiplicative and is equal to |\varphi(n)|.
Proof: |\varphi = \mu\star\operatorname{id}|. We have:
\[\begin{flalign}
\varphi(n_P)
& = \sum_{d\mid n_P}\mu(d)\frac{n_P}{d} \\
& = \sum_{Q\subseteq P}\mu(Q)\frac{n_P}{n_Q} \\
& = \sum_{Q\subseteq \mathrm{dom}(P)}(-1)^{\vert Q\vert}\frac{n_P}{n_Q}
\end{flalign}\]
We can see an inclusion-exclusion
pattern. Specifically, let |C_k = \{ c \in [k] \mid \gcd(c, k) = 1\}| be the numbers less than
or equal to |k| and coprime to |k|. Let |S_{k,m} = \{ c \in [k] \mid m \mid c\}|. We have
|S_{k,a} \cap S_{k,b} = S_{k,\operatorname{lcm}(a,b)}|. Also, when |c \mid k|, then
|\vert S_{k,c}\vert = k/c|. |C_{n_P} = [n_P] \setminus \bigcup_{p \in \mathrm{dom}(P)} S_{n_P,p}|
because every number not coprime to |n_P| shares some prime factor with it. Applying
inclusion-exclusion to the union yields
\[\begin{align}
\vert C_{n_P}\vert
& = n_P - \sum_{\varnothing\neq Q\subseteq\mathrm{dom}(P)}(-1)^{\vert Q\vert+1}\left\vert \bigcap_{p\in Q}S_{n_P,p}\right\vert \\
& = n_P + \sum_{\varnothing\neq Q\subseteq\mathrm{dom}(P)}(-1)^{\vert Q\vert}\frac{n_P}{\prod_{p\in Q}p} \\
& = \sum_{Q\subseteq\mathrm{dom}(P)}(-1)^{\vert Q\vert}\frac{n_P}{n_Q}
\end{align}\]
|\square|
Many of you will already have recognized that this is Euler’s totient function.
Combinatorial Species
The book Combinatorial Species and Tree-Like Structures
has many examples where Dirichlet convolutions and Möbius inversion come up.
A combinatorial species is a functor |\operatorname{Core}(\mathbf{FinSet})\to\mathbf{FinSet}|.
Any permutation on a finite set can be decomposed into a collection of cyclic permutations.
Let |U| be a finite set of cardinality |n| and |\pi : U \cong U| a permutation of |U|.
For any |u\in U|, there is a smallest |k\in\mathbb N_+| such that |\pi^k(u) = u| where
|\pi^{k+1} = \pi \circ \pi^k| and |\pi^0 = \operatorname{id}|. The |k| elements
|\mathcal O(u)=\{\pi^{i-1}(u)\mid i\in[k]\}| make up a cycle of length |k|, and |\pi|
restricted to |U\setminus O(u)| is a permutation on this smaller set. We can just inductively pull
out another cycle until we run out of elements. Write |\pi_k| for the number of cycles of length
|k| in the permutation |\pi|. We clearly have |n = \sum_{k=1}^\infty k\pi_k| as every cycle
has |k| elements in it.
Write |\operatorname{fix}\pi| for the number of fixed points of |\pi|, i.e. the cardinality of
the set |\{u\in U\mid \pi(u) = u\}|. Clearly, every element that is fixed by |\pi^k| needs
to be in a cycle whose length divides |k|. This leads to the equation:
\[ \operatorname{fix}\pi^k = \sum_{d\mid k} d\pi_d = ((d \mapsto d\pi_d) \star \bar 1)(k)\]
Since |F(\pi^k) = F(\pi)^k| for a combinatorial species |F|, Möbius inversion, as explicitly
stated in Proposition 2.2.3 of Combinatorial Species and Tree-Like Structures, leads to:
\[k(F(\pi))_k
= \sum_{d\mid k}\mu\left(\frac{k}{d}\right)\operatorname{fix}F(\pi^d)
= (\mu\star(d\mapsto \operatorname{fix}F(\pi^d)))(k) \]
If we Dirichlet convolve both sides of this with |\operatorname{id}|, replacing |F(\pi)| with
|\beta| as it doesn’t matter that this permutation comes from an action of a species, we get:
\[\sum_{d\mid m} d\beta_d(m/d)
= m\sum_{d\mid m} \beta_d
= (\varphi\star(d\mapsto \operatorname{fix}\beta^d))(m)\]
This is just using |\varphi = \operatorname{id}\star\mu|. If we choose |m| such that
|\beta^m = \operatorname{id}|, then we get |\sum_{d\mid m} \beta_d = \sum_{k=1}^\infty \beta_k|
because |\beta_k| will be |0| for all the |k| which don’t divide |m|.
This makes the previous equation into equation 2.2 (34) in the book.
Since we know |n = \sum_{k=1}^\infty k\pi_k| for any permutation |\pi|, we also get:
\[\vert F([n])\vert
= \sum_{k=1}^\infty\sum_{d\mid k}\mu\left(\frac{k}{d}\right)\operatorname{fix}F(\pi^d)
= \sum_{k=1}^\infty(\mu\star(d\mapsto\operatorname{fix}F(\pi^d)))(k)\]
These equations give us a way to compute some of these divisor sums by looking at the number
fixed points and cycles of the action of species and vice versa. For example, 2.3 (49) is a
series of Dirichlet convolutions connected to weighted species.
Example 12 from this book presents a nice and perhaps surprising identity. The core of it can be
written as: \[\sum_{k=1}^\infty\ln(1-ax^k) = \sum_{k=1}^\infty\rho_k(a)\ln(1-x^k)\]
where |\rho_k(a) = k^{-1}\sum_{d\mid k}\varphi(k/d)a^d|. We can rewrite this definition as
the characterization |k\rho_k(a) = (\varphi\star a^{({-})})(k)|. Recalling that
|\varphi = \mu \star \operatorname{id}| and |\ln(1-x) = -\sum_{n=1}^\infty x^n/n|, we get
the following derivation:
Theorem: \[\sum_{k=1}^\infty\ln(1-ax^k) = \sum_{k=1}^\infty\rho_k(a)\ln(1-x^k)\]
where |\rho_k(a) = k^{-1}\sum_{d\mid k}\varphi(k/d)a^d|.
Proof:
\[\begin{flalign}
\sum_{k=1}^\infty\ln(1-ax^k)
& = -\sum_{k=1}^\infty\sum_{n=1}^\infty \frac{a^n x^{nk}}{n} \\
& = -\sum_{n=1}^\infty\sum_{k=1}^\infty \frac{a^n x^{nk}}{n} \\
& = -\sum_{N=1}^\infty\sum_{k\mid N} \frac{a^{N/k} x^N}{N/k} \tag{N=nk} \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}\sum_{k\mid N} ka^{N/k} \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}(\operatorname{id}\star a^{({-})})(N) \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}(\delta\star\operatorname{id}\star a^{({-})})(N) \tag{the trick} \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}(\bar 1\star\mu\star\operatorname{id}\star a^{({-})})(N) \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}(\bar 1\star\varphi\star a^{({-})})(N) \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}\sum_{k\mid N}(\varphi\star a^{({-})})(k) \\
& = -\sum_{N=1}^\infty\frac{x^N}{N}\sum_{k\mid N}k\rho_k(a) \\
& = -\sum_{n=1}^\infty\frac{x^{nk}}{n}\sum_{k=1}^\infty\rho_k(a) \tag{N=nk again} \\
& = \sum_{k=1}^\infty\rho_k(a) \ln(1-x^k)
\end{flalign}\] |\square|
Derivative of Dirichlet series
We can easily compute the derivative of a Dirichlet series (assuming sufficiently strong convergence
so we can push the differentiation into the sum):
\[\begin{flalign}
\mathcal D[f]’(s)
& = \frac{d}{ds}\sum_{n=1}^\infty f(n)n^{-s} \\
& = \sum_{n=1}^\infty f(n)\frac{d}{ds}n^{-s} \\
& = \sum_{n=1}^\infty f(n)\frac{d}{ds}e^{-s\ln n} \\
& = \sum_{n=1}^\infty -f(n)\ln n e^{-s\ln n} \\
& = -\sum_{n=1}^\infty f(n)\ln n n^{-s} \\
& = -\mathcal D[f\ln](s)
\end{flalign}\]
This leads to the identity |\frac{d}{ds}\ln\mathcal D[f](s) = \mathcal D[f]’ (s)/\mathcal D[f](s) = -\mathcal D[f\ln \star \mu](s)|.
For example, we have |-\zeta’(s)/\zeta(s) = \mathcal D[\ln \star \mu](s)|. Using the Euler
product formula, we have |\ln\zeta(s) = -\sum_{p\in\mathbb P}\ln(1-p^{-s})|. Differentiating
this gives
\[\begin{flalign}
\frac{d}{ds}\ln\zeta(s)
& = -\sum_{p\in\mathbb P} p^{-s}\ln p/(1 - p^{-s}) \\
& = -\sum_{p\in\mathbb P} \sum_{k=1}^\infty \ln p (p^k)^{-s} \\
& = -\sum_{n=1}^\infty \Lambda(n) n^{-s} \\
& = -\mathcal D[\Lambda](s)
\end{flalign}\]
where |\Lambda(n) = \begin{cases}\ln p,&p\in\mathbb P\land\exists k\in\mathbb N_+.n=p^k \\ 0, & \text{otherwise}\end{cases}|.
|\Lambda|, which is not a multiplicative nor an additive function, is known as the von Mangoldt function.
Just to write it explicitly, the above implies |\Lambda = \ln \star \mu|, i.e. |\Lambda| is the
Möbius inversion of |\ln|. This can be generalized for arbitrary completely multiplicative
functions besides |\bar 1| to get |\mathcal D[f]’/\mathcal D[f] = \mathcal D[f\Lambda]|.
We now have multiple perspectives on |\Lambda| which is a kind of “indicator function” for prime
powers.
Dirichlet Inverse
Let’s say we’re given an arithmetic function |f|, and we want to find an arithmetic function |g|
such that |f \star g = \delta| which we’ll call the Dirichlet inverse of |f|.
We immediately get |(f \star g)(1) = f(1)g(1) = 1 = \delta(1)|.
So, supposing |f(1)\neq 1|, we can define |g(1) = 1/f(1)|. We then get a recurrence relation for
all the remaining values of |g| via:
\[0 = (f \star g)(n) = f(1)g(n) + \sum_{d \mid n, d\neq 1} f(d)g(n/d)\]
for |n > 1|. Solving for |g(n)|, we have:
\[g(n) = -f(1)^{-1}\sum_{d\mid n,d\neq 1}f(d)g(n/d)\]
where the right-hand side only requires |g(k)| for |k < n|. If |f| is multiplicative, then
|f(1) = 1| and the inverse of |f| exists.
If |f| is completely multiplicative, its Dirichlet inverse is |\mu f|. This follows easily from
|f \star \mu f = (\bar 1 \star \mu)f = \delta f = \delta|. As an example, |({-})^z| is
completely multiplicative so its inverse is |({-})^z\mu|. Since the inverse of a Dirichlet
convolution is the convolution of the inverses, we get |\varphi^{-1}(n) = \sum_{d\mid n}d\mu(d)|.
Not to be confused with |\varphi(n) = (\operatorname{id}\star\mu)(n) = \sum_{d\mid n} d\mu(n/d)|.
Less trivially, the inverse of a multiplicative function is also a multiplicative function.
We can prove it by complete induction on |\mathbb N_+| using the formula for |g| from above.
Theorem: If |f\star g = \delta|, then |g| is multiplicative when |f| is.
Proof: Let |n = ab| where |a| and |b| are coprime. If |a| (or, symmetrically, |b|) is equal to
|1|, then since |g(1) = 1/f(1) = 1|, we have |g(1n) = g(1)g(n) = g(n)|. Now assume neither |a| nor
|b| are |1| and, as the induction hypothesis, assume that |g| is multiplicative on all numbers less
than |n|. We have:
\[\begin{flalign}
g(ab)
& = -\sum_{d\mid ab,d\neq 1}f(d)g(ab/d) \\
& = -\sum_{d_a \mid a}\sum_{d_b \mid b,d_a d_b \neq 1}f(d_ad_b)g(ab/(d_ad_b)) \\
& = -\sum_{d_a \mid a}\sum_{d_b \mid b,d_a d_b \neq 1}f(d_a)f(d_b)g(a/d_a)g(b/d_b)) \\
& = -\sum_{d_b \mid b,d_b \neq 1}f(d_b)g(a)g(b/d_b))
- \sum_{d_a \mid a,d_a \neq 1}\sum_{d_b \mid b}f(d_a)f(d_b)g(a/d_a)g(b/d_b)) \\
& = -g(a)\sum_{d \mid b,d \neq 1}f(d)g(b/d))
- \sum_{d_a \mid a,d_a \neq 1}f(d_a)g(a/d_a)\sum_{d_b \mid b}f(d_b)g(b/d_b)) \\
& = g(a)g(b) - \sum_{d_a \mid a,d_a \neq 1}f(d_a)g(a/d_a) (f \star g)(b) \\
& = g(a)g(b) - \delta(b)\sum_{d_a \mid a,d_a \neq 1}f(d_a)g(a/d_a) \\
& = g(a)g(b)
\end{flalign}\] |\square|
Assuming |f| has a Dirichlet inverse, we also have:
\[\mathcal D[f^{-1}](s) = \mathcal D[f](s)^{-1}\]
immediately from the convolution theorem.
More Examples
Given a multiplicative function |f|:
\[\begin{align}
\mathcal D[f(\gcd({-},n_P))](s)
& = \zeta(s)\prod_{(p,k)\in P}(1 - p^{-s})\left(\sum_{n=0}^\infty f(p^{\min(k,n)})p^{-ns}\right) \\
& = \zeta(s)\prod_{(p,k)\in P}(1 - p^{-s})\left(\frac{f(p^k)p^{-(k+1)s}}{1 - p^{-s}} + \sum_{n=0}^k f(p^n)p^{-ns}\right)
\end{align}\]
As an example, |\eta(s) = (1 - 2^{1-s})\zeta(s) = \mathcal D[f](s)| where
|f(n) = \begin{cases}-1,&n=2\\1,&n\neq 2\end{cases}|.
Alternatively, |f(n) = \mu(\gcd(n, 2))| and we can apply the above formula to see:
\[\begin{flalign}
\mathcal D[\mu(\gcd({-},2))]
& = \zeta(s)(1-2^{-s})\left(\frac{\mu(2)2^{-2s}}{1 - 2^{-s}} + \sum_{n=0}^1 \mu(2^n)2^{-ns}\right) \\
& = \zeta(s)(1-2^{-s})\left(\frac{-2^{-2s}}{1 - 2^{-s}} + 1 - 2^{-s}\right) \\
& = \zeta(s)(-2^{-2s} + (1 - 2^{-s})^2) \\
& = \zeta(s)(1 - 2^{1-s})
\end{flalign}\]
|\lambda| and |\gamma|
Recalling, |\lambda| is completely multiplicative and is characterized by |\lambda(p) = -1|.
We can show that |\mathcal D[\lambda](s) = \zeta(2s)/\zeta(s)| which is equivalent to saying
|\bar 1^{(2)} \star \mu = \lambda| or |\lambda\star\bar 1 = \bar 1^{(2)}|.
\[\begin{flalign}
\zeta(2s)/\zeta(s)
& = \prod_{p\in\mathbb P} \frac{1-p^{-s}}{1-(p^{-s})^2} \\
& = \prod_{p\in\mathbb P} \frac{1-p^{-s}}{(1-p^{-s})(1+p^{-s})} \\
& = \prod_{p\in\mathbb P} (1 + p^{-s})^{-1} \\
& = \prod_{p\in\mathbb P} (1 - \lambda(p)p^{-s})^{-1} \\
& = \mathcal D[\lambda](s)
\end{flalign}\]
We have |\lambda\mu = \vert\mu\vert = \mu\mu| is the inverse of |\lambda| so
|\mathcal D[\vert\mu\vert](s) = \zeta(s)/\zeta(2s)|.
Recalling, |\gamma| is multiplicative and is characterized by |\gamma(p^n) = -1|.
\[\begin{flalign}
\mathcal D[\gamma](s)
& = \prod_{p \in \mathbb P}\left(1 + \sum_{n=1}^\infty \gamma(p^n)p^{-ns}\right) \\
& = \prod_{p \in \mathbb P}\left(1 - \sum_{n=1}^\infty p^{-ns}\right) \\
& = \prod_{p \in \mathbb P}\left(1 - \left(\sum_{n=0}^\infty p^{-ns} - 1\right)\right) \\
& = \prod_{p \in \mathbb P}\frac{2(1 - p^{-s}) - 1}{1 - p^{-s}} \\
& = \prod_{p \in \mathbb P}\frac{1 - 2p^{-s}}{1 - p^{-s}}
\end{flalign}\]
This implies that |(\gamma\star\mu)(p^n) = \begin{cases}-2, & n=1 \\ 0, & n > 1 \end{cases}|.
Indicator Functions
Let |1_{\mathbb P}| be the indicator function for the primes.
We have |\omega = 1_{\mathbb P}\star\bar 1| or |1_{\mathbb P} = \omega\star\mu|. Directly,
|\mathcal D[1_{\mathbb P}](s) = \sum_{p\in\mathbb P}p^{-s}| so we have
|\mathcal D[\omega](s)/\zeta(s) = \sum_{p\in\mathbb P} p^{-s}|.
Lemma: |\mathcal D[1_{\mathbb P}](s)=\sum_{n=1}^\infty \frac{\mu(n)}{n}\ln\zeta(ns)|
Proof: We proceed as follows:
\[\begin{align}
\sum_{n=1}^\infty \frac{\mu(n)}{n}\ln\zeta(ns)
& = \sum_{n=1}^\infty \frac{\mu(n)}{n}\ln\left(\prod_{p\in\mathbb P}(1 - p^{-ns})^{-1}\right) \\
& = -\sum_{n=1}^\infty \frac{\mu(n)}{n}\sum_{p\in\mathbb P}\ln(1 - p^{-ns}) \\
& = \sum_{p\in\mathbb P}\sum_{n=1}^\infty \frac{\mu(n)}{n}\sum_{k=1}^\infty p^{-kns}/k \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \sum_{N=kn} \frac{\mu(n)}{N}p^{-Ns} \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N}\sum_{N=kn}\mu(n) \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N}(\mu\star\bar 1)(N) \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N}\delta(N) \\
& = \sum_{p\in\mathbb P} p^{-s} \\
& = \mathcal D[1_{\mathbb P}](s)
\end{align}\] |\square|
Let |1_{\mathcal P}| be the indicator function for prime powers.
|\Omega = 1_{\mathcal P}\star\bar 1| or |1_{\mathcal P} = \Omega\star\mu|.
|\mathcal D[1_{\mathcal P}](s) = \sum_{p\in\mathbb P}(1 - p^{-s})^{-1}| so we have
|\mathcal D[\Omega](s)/\zeta(s) = \sum_{p\in\mathbb P}(1 - p^{-s})^{-1}|.
Lemma: |\mathcal D[1_{\mathcal P}](s)=\sum_{n=1}^\infty \frac{\varphi(n)}{n}\ln\zeta(ns)|
Proof: This is quite similar to the previous proof.
\[\begin{align}
\sum_{n=1}^\infty \frac{\varphi(n)}{n}\ln\zeta(ns)
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N}\sum_{N=kn}\varphi(n) \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N}(\varphi\star\bar 1)(N) \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty \frac{p^{-Ns}}{N} N \\
& = \sum_{p\in\mathbb P}\sum_{N=1}^\infty p^{-Ns} \\
& = \mathcal D[1_{\mathcal P}](s)
\end{align}\] |\square|
Summatory Functions
One thing we’ve occasionally been taking for granted is that the operator |\mathcal D| is
injective. That is, |\mathcal D[f] = \mathcal D[g]| if and only if |f = g|. To show this, we’ll
use the fact that we can (usually) invert
the Mellin transform which can be viewed roughly as a version of |\mathcal D| that operates on
continuous functions.
Before talking about the Mellin transform, we’ll talk about summatory functions as this will ease
our later discussion.
We will turn a sum into a continuous function via a zero-order hold, i.e. we will take the floor
of the input. Thus |\sum_{n\leq x} f(n)| is constant on any interval of the form |[k,k+1)|. It
then (potentially) has jump discontinuities at integer values. The beginning of the sum is at |n=1|
so for all |x<1|, the sum up to |x| is |0|. We will need a slight tweak to better deal with these
discontinuities. This will be indicated by a prime on the summation sign.
For non-integer values of |x|, we have:
\[\sum_{n \leq x}’ f(n) = \sum_{n \leq x} f(n)\]
For |m| an integer, we have:
\[
\sum_{n \leq m}’ f(n)
= \frac{1}{2}\left(\sum_{n<m} f(n) + \sum_{n \leq m} f(n)\right)
= \sum_{n\leq m} f(n) - f(m)/2
\]
This kind of thing should be familiar to those who’ve worked with things like Laplace transforms of
discontinuous functions.
(Not for no reason…)
One reason for introducing these summation functions is they are a little easier to
work with. Arguably, we want something like |\frac{d}{dx}\sum_{n\leq x}f(n) = \sum_{n=1}^\infty f(n)\delta(n-x)|,
but that means we end up with a bunch of distribution nonsense and even more improper integrals.
The summation function may be discontinuous, but it at least has a finite value everywhere.
Of course, another reason for introducing these functions is that they often are values we’re
interested in.
Several important functions are these continuous “sums” of arithmetic functions of this form:
- Mertens function:
|M(x) = \sum_{n\leq x}’ \mu(n)|
- Chebyshev function:
|\vartheta(x) = \sum_{p\leq x, p\in\mathbb P}’ \ln p = \sum_{n\leq x} 1_{\mathbb P}(n)\ln n|
- Second Chebyshev function:
|\psi(x) = \sum_{n\leq x}’ \Lambda(n) = \sum_{n=1}^\infty \vartheta(x^{1/n})|
- The prime-counting function:
|\pi(x) = \sum_{n\leq x}’ 1_{\mathbb P}|
- Riemann’s prime-power counting function:
|\Pi_0(x) = \sum_{n\leq x} \frac{\Lambda(n)}{\ln n}
= \sum_{n=1}^\infty \sum_{p^n\leq x,p\in\mathbb P}’ n^{-1}
= \sum_{n=1}^\infty\pi(x^{1/n})n^{-1}|
- |D(x) = \sum_{n\leq x}d(n)|
These are interesting in how they related to the prime-counting function.
Let’s consider the arithmetic function |\Lambda/\ln| whose Dirichlet series is |\ln\zeta|.
We have the summation function |\sum_{n\leq x}’ \Lambda(n)/\ln(n)|, but |\Lambda(n)| is |0|
except when |n=p^k| for some |p\in\mathbb P| and |k\in\mathbb N_+|. Therefore, we have
\[\begin{align}
\sum_{n\leq x}’ \frac{\Lambda(n)}{\ln(n)}
& = \sum_{k=1}^\infty\sum_{p^k\leq x, p\in\mathbb P}’ \frac{\Lambda(p^k)}{\ln(p^k)} \\
& = \sum_{k=1}^\infty\sum_{p^k\leq x, p\in\mathbb P}’ \frac{\ln(p)}{k\ln(p)} \\
& = \sum_{k=1}^\infty\sum_{p^k\leq x, p\in\mathbb P}’ \frac{1}{k} \\
& = \sum_{k=1}^\infty \frac{1}{k} \sum_{p^k\leq x, p\in\mathbb P}’ 1 \\
& = \sum_{k=1}^\infty \frac{1}{k} \sum_{p\leq x^{1/k}, p\in\mathbb P}’ 1 \\
& = \sum_{k=1}^\infty \frac{\pi(x^{1/k})}{k} \\
\end{align}\]
|\ln\zeta(s) = s\mathcal M[\Pi_0](-s)=\mathcal D[\Lambda/\ln](s)|
where |\mathcal M| is the Mellin transform, and the connection to Dirichlet series is described
in the following section.
The definition of the Mellin transform and its
inverse are:
\[\mathcal M[f](s) = \int_0^\infty x^s\frac{f(x)}{x}dx\]
\[\mathcal M^{-1}[\varphi](x) = \frac{1}{2\pi i}\int_{c-i\infty}^{c+i\infty} x^{-s}\varphi(s)ds\]
The contour integral is intended to mean the vertical line with real part |c| traversed from
negative to positive imaginary values. Modulo the opposite sign of |s| and the extra factor of |x|,
this is quite similar to a continuous version of a Dirichlet series.
The Mellin transform is closely related to the two-sided Laplace transform.
\[\mathcal D[f](s) = s\mathcal M\left[x\mapsto \sum_{n\leq x}’ f(n)\right](-s)\]
Using Mellin transform properties,
particularly the one for transforming the derivative, we can write the following.
\[\begin{align}
\mathcal D[f](s) = s\mathcal M\left[x\mapsto \sum_{n\leq x}’ f(n)\right](-s)
& \iff \mathcal D[f](1-s) = -(s-1)\mathcal M\left[x\mapsto \sum_{n\leq x}’ f(n)\right](s-1) \\
& \iff \mathcal D[f](1-s) = \mathcal M\left[x\mapsto \frac{d}{dx}\sum_{n\leq x}’ f(n)\right](s) \\
& \iff \mathcal D[f](1-s) = \int_0^\infty x^{s-1}\frac{d}{dx}\sum_{n\leq x}’ f(n)dx \\
& \iff \mathcal D[f](1-s) = \int_0^\infty x^{s-1}\sum_{n=1}^\infty f(n)\delta(x-n)dx \\
& \iff \mathcal D[f](1-s) = \sum_{n=1}^\infty f(n)n^{s-1} \\
& \iff \mathcal D[f](s) = \sum_{n=1}^\infty f(n)n^{-s}
\end{align}\]
This leads to Perron’s formula
\[\begin{align}
\sum_{n\leq x}’ f(n)
& = \mathcal M^{-1}[s\mapsto -\mathcal D[f](-s)/s](x) \\
& = \frac{1}{2\pi i}\int_{-c-i\infty}^{-c+i\infty}\frac{\mathcal D[f](-s)}{-s} x^{-s} ds \\
& = -\frac{1}{2\pi i}\int_{c+i\infty}^{c-i\infty}\frac{\mathcal D[f](s)}{s} x^s ds \\
& = \frac{1}{2\pi i}\int_{c-i\infty}^{c+i\infty}\frac{\mathcal D[f](s)}{s} x^s ds
\end{align}\]
for which we need to take the Cauchy principal value
to get something defined. (See also Abel summation.)
There are side conditions on the convergence of |\mathcal D[f]| for these formulas to be
justified. See the links.
Many of the operations we’ve described on Dirichlet series follow from Mellin transform properties.
For example, we have |\mathcal M[f]’(s) = \mathcal M[f\ln](s)| generally.
Summary
Properties
Dirichlet Convolution
Dirichlet convolution is |(f\star g)(n) = \sum_{d\mid n} f(d)g(n/d) = \sum_{mk=n} f(m)g(k)|.
Dirichlet convolution forms a commutative ring with it as the multiplication, |\delta| as the
multiplicative unit and the usual additive structure. This is to say that Dirichlet convolution
is commutative, associative, unital, and bilinear.
For |f| completely multiplicative, |f(g\star h) = fg \star fh|.
Dirichlet Inverse
For any |f| such that |f(1)\neq 0|, there is a |g| such that |f\star g = \delta|. In particular,
the set of multiplicative functions forms a subgroup of this multiplicative group, i.e. the
Dirichlet convolution of multiplicative functions is multiplicative.
If |f(1) \neq 0|, then |f \star g = \delta| where |g| is defined by the following recurrence:
\[\begin{flalign}
g(1) & = 1/f(1) \\
g(n) & = -f(1)^{-1}\sum_{d\mid n,d\neq 1}f(d)g(n/d)
\end{flalign}\]
For a completely multiplicative |f|, its Dirichlet inverse is |\mu f|.
Convolution Theorem
\[\mathcal D[f](s)\mathcal D[g](s) = \mathcal D[f\star g](s)\]
Möbius Inversion
\[\delta = \bar 1 \star \mu\]
This means from a divisor sum |g(n)\sum_{d\mid n}f(d) = (f\star\bar 1)(n)| for each |n|, we can
recover |f| via |g\star\mu = f\star\bar 1\star\mu = f|. Which is to say
|f(n)=\sum_{d\mid n}g(d)\mu(n/d)|.
This can be generalized via |({-})^k\mu\star({-})^k = \delta|. In sums, this means when
|g(n)=\sum_{d\mid n}d^k f(n/d)|, then |f(n)=\sum_{d\mid n}\mu(d)d^k g(n/d)|.
Let |h| be a completely multiplicative function.
Given |g(m) = \sum_{n=1}^\infty f(mh(n))|, then |f(n) = \sum_{m=1}^\infty \mu(m)g(nh(m))|.
Using the Möbius function for finite multisets and their inclusion ordering, we can recast
Möbius inversion of naturals as Möbius inversion of finite multisets (of primes) a la:
\[n_P
= \sum_{Q\subseteq P}\mu(P\setminus Q)n_Q
= \sum_{Q\subseteq P}\mu(n_P/n_Q)n_Q
= \sum_{d\mid n_P}\mu(n_P/d)d
\]
As a nice result, we have:
\[\sum_{n=1}^\infty\ln(1-ax^n) = \sum_{n=1}^\infty\rho_n(a)\ln(1-x^n)\]
where |n\rho_n(a) = (\varphi \star a^{({-})})(n)|.
Dirichlet Series
\[\mathcal D[f](s) = \sum_{n=1}^\infty f(n)n^{-s}\]
\[\mathcal D[n\mapsto f(n)n^k](s) = \mathcal D[f](s - k)\]
\[\mathcal D[f^{-1}](s) = \mathcal D[f](s)^{-1}\]
where the inverse on the left is the Dirichlet inverse.
\[\mathcal D[f]’(s) = -\mathcal D[f\ln](s)\]
For a completely multiplicative |f|,
\[\mathcal D[f]’(s)/\mathcal D[f](s) = -\mathcal D[f\Lambda](s)\]
and:
\[\ln\mathcal D[f](s) = \mathcal D[f\Lambda/\ln](s)\]
Dirichlet series as a Mellin transform:
\[\mathcal D[f](s) = s\mathcal M\left[x\mapsto \sum_{n\leq x}’ f(n)\right](-s)\]
The corresponding inverse Mellin transform statement is called Perron’s Formula:
\[\sum_{n\leq x}’ f(n)
= \frac{1}{2\pi i}\int_{c-i\infty}^{c+i\infty}\frac{\mathcal D[f](s)}{s} x^s ds\]
Assuming |f| is multiplicative, we have:
\[\mathcal D[f](s)
= \prod_{p \in \mathbb P}\sum_{n=0}^\infty f(p^n)p^{-ns}
= \prod_{p \in \mathbb P}\left(1 + \sum_{n=1}^\infty f(p^n)p^{-ns}\right)
\]
When |f| is completely multiplicative, this can be simplified to:
\[\mathcal D[f](s) = \prod_{p \in \mathbb P}(1 - f(p)p^{-s})^{-1} \]
Lambert Series
Given an arithmetic function |a|, these are series of the form:
\[
\sum_{n=1}^\infty a(n) \frac{x^n}{1-x^n} = \sum_{n=1}^\infty (a \star \bar 1)(n) x^n
\]
\[\sum_{n=1}^\infty \mu(n) \frac{x^n}{1-x^n} = x\]
\[\sum_{n=1}^\infty \varphi(n) \frac{x^n}{1-x^n} = \frac{x}{(1-x)^2}\]
Arithmetic function definitions
|f(p^n)=\cdots| implies a multiplicative/additive function, while |f(p)=\cdots| implies a
completely multiplicative/additive function.
|p^z| for |z\in\mathbb C| is completely multiplicative. This includes the identity function
(|z=1|) and |\bar 1| (|z=0|). For any multiplicative |f|, |f\circ \gcd({-},k)| is multiplicative.
|\ln| is completely additive.
Important but neither additive nor multiplicative are the indicator functions for primes
|1_{\mathbb P}| and prime powers |1_{\mathcal P}|.
The following functions are (completely) multiplicative unless otherwise specified.
\[\begin{flalign}
\delta(p) & = 0 \tag{Kronecker delta} \\
\bar 1(p) & = 1 = p^0 \\
\mu(p^n) & = \begin{cases}-1, & n = 1 \\ 0, & n > 1\end{cases} \tag{Möbius function} \\
\Omega(p) & = 1 \tag{additive} \\
\lambda(p) & = -1 = (-1)^{\Omega(p)} \tag{Liouville function} \\
\omega(p^n) & = 1 \tag{additive} \\
\gamma(p^n) & = -1 = (-1)^{\omega(p^n)} \\
a(p^n) & = p(n) \tag{p(n) is the partition function} \\
\varphi(p^n) & = p^n - p^{n-1} = p^n(1 - 1/p) = J_1(p^n) \tag{Euler totient function} \\
\sigma_k(p^n) & = \sum_{m=0}^n p^{km} = \sum_{d\mid p^n} d^k = \frac{p^{k(n+1)}-1}{p^k - 1} \tag{last only works for k>0} \\
d(p^n) & = n + 1 = \sigma_0 \\
f^{[k]}(p^n) & = \begin{cases}f(p^m),& km=n\\0,& k\nmid n\end{cases} \tag{f multiplicative} \\
\Lambda(n) & = \begin{cases}\ln p,&p\in\mathbb P\land\exists k\in\mathbb N_+.n=p^k \\ 0, & \text{otherwise}\end{cases} \tag{not multiplicative} \\
J_k(p^n) & = p^{kn} - p^{k(n-1)} = p^{kn}(1 - p^{-k}) \tag{Jordan totient function} \\
\psi_k(p^n) & = p^{kn} + p^{k(n-1)} = p^{kn}(1 + p^{-k}) = J_{2k}(p^n)/J_k(p^n) \tag{Dedekind psi function} \\
\end{flalign}\]
Dirichlet convolutions
\[\begin{flalign}
\delta & = \bar 1 \star \mu \\
\varphi & = \operatorname{id}\star\mu \\
\sigma_z & = ({-})^z \star \bar 1 = \psi_z \star \bar 1^{(2)} \\
\sigma_1 & = \varphi \star d \\
d & = \sigma_0 = \bar 1 \star \bar 1 \\
f \star f & = fd \tag{f completely multiplicative} \\
f\Lambda & = f\ln \star f\mu = f\ln \star f^{-1} \tag{f completely multiplicative, Dirichlet inverse} \\
\lambda & = \bar 1^{(2)} \star \mu \\
\vert\mu\vert & = \lambda^{-1} = \mu\lambda \tag{Dirichlet inverse} \\
2^\omega & = \vert\mu\vert \star \bar 1 \\
\psi_z & = ({-})^z \star \vert\mu\vert \\
\operatorname{fix} \pi^{(-)} & = \bar 1 \star (k \mapsto k\pi_k) \tag{for a permutation} \\
({-})^k & = J_k \star \bar 1
\end{flalign}\]
More Dirichlet convolution identities are here,
though many are trivial consequences of the earlier properties.
Dirichlet series
\[\begin{array}{l|ll}
f(n) & \mathcal D[f](s) & \\ \hline
\delta(n) & 1 & \\
\bar 1(n) & \zeta(s) & \\
n & \zeta(s-1) & \\
n^z & \zeta(s-z) & \\
\sigma_z(n) & \zeta(s-z)\zeta(s) & \\
\mu(n) & \zeta(s)^{-1} & \\
\vert\mu(n)\vert & \zeta(s)/\zeta(2s) & \\
\varphi(n) & \zeta(s-1)/\zeta(s) & \\
d(n) & \zeta(s)^2 & \\
\mu(\gcd(n, 2)) & \eta(s) = (1-2^{1-s})\zeta(s) & \\
\lambda(n) & \zeta(2s)/\zeta(s) \\
\gamma(n) & \prod_{p \in \mathbb P}\frac{1-2p^{-s}}{1-p^{-s}} & \\
f^{[k]}(n) & \mathcal D[f](ks) & \\
f(n)\ln n & -\mathcal D[f]’ (s) & f\text{ completely multiplicative}\\
\Lambda(n) & -\zeta’(s)/\zeta(s) & \\
\Lambda(n)/\ln(n) & \ln\zeta(s) & \\
1_{\mathbb P}(n) & \sum_{n=1}^\infty \frac{\mu(n)}{n}\ln\zeta(ns) & \\
1_{\mathcal P}(n) & \sum_{n=1}^\infty \frac{\varphi(n)}{n}\ln\zeta(ns) & \\
\psi_k(n) & \zeta(s)\zeta(s - k)/\zeta(2s) & \\
J_k(n) & \zeta(s - k)/\zeta(s) &
\end{array}\]