One of the basic general problems in analytic number theory is to understand as much as possible the fluctuations of the Möbius function ${\mu(n)}$, defined as ${(-1)^k}$ when ${n}$ is the product of ${k}$ distinct primes, and zero otherwise. For instance, as ${\mu}$ takes values in ${\{-1,0,1\}}$, we have the trivial bound

$\displaystyle |\sum_{n \leq x} \mu(n)| \leq x$

and the seemingly slight improvement

$\displaystyle \sum_{n \leq x} \mu(n) = o(x) \ \ \ \ \ (1)$

is already equivalent to the prime number theorem, as observed by Landau (see e.g. this previous blog post for a proof), while the much stronger (and still open) improvement

$\displaystyle \sum_{n \leq x} \mu(n) = O(x^{1/2+o(1)})$

is equivalent to the notorious Riemann hypothesis.

There is a general Möbius pseudorandomness heuristic that suggests that the sign pattern ${\mu}$ behaves so randomly (or pseudorandomly) that one should expect a substantial amount of cancellation in sums that involve the sign fluctuation of the Möbius function in a nontrivial fashion, with the amount of cancellation present comparable to the amount that an analogous random sum would provide; cf. the probabilistic heuristic discussed in this recent blog post. There are a number of ways to make this heuristic precise. As already mentioned, the Riemann hypothesis can be considered one such manifestation of the heuristic. Another manifestation is the following old conjecture of Chowla:

Conjecture 1 (Chowla’s conjecture) For any fixed integer ${m}$ and exponents ${a_1,a_2,\ldots,a_m \geq 0}$, with at least one of the ${a_i}$ odd (so as not to completely destroy the sign cancellation), we have

$\displaystyle \sum_{n \leq x} \mu(n+1)^{a_1} \ldots \mu(n+m)^{a_m} = o_{x \rightarrow \infty;m}(x).$

Note that as ${\mu^a = \mu^{a+2}}$ for any ${a \geq 1}$, we can reduce to the case when the ${a_i}$ take values in ${0,1,2}$ here. When only one of the ${a_i}$ are odd, this is essentially the prime number theorem in arithmetic progressions (after some elementary sieving), but with two or more of the ${a_i}$ are odd, the problem becomes completely open. For instance, the estimate

$\displaystyle \sum_{n \leq x} \mu(n) \mu(n+2) = o(x)$

is morally very close to the conjectured asymptotic

$\displaystyle \sum_{n \leq x} \Lambda(n) \Lambda(n+2) = 2\Pi_2 x + o(x)$

for the von Mangoldt function ${\Lambda}$, where ${\Pi_2 := \prod_{p > 2} (1 - \frac{1}{(p-1)^2}) = 0.66016\ldots}$ is the twin prime constant; this asymptotic in turn implies the twin prime conjecture. (To formally deduce estimates for von Mangoldt from estimates for Möbius, though, typically requires some better control on the error terms than ${o()}$, in particular gains of some power of ${\log x}$ are usually needed. See this previous blog post for more discussion.)

Remark 2 The Chowla conjecture resembles an assertion that, for ${n}$ chosen randomly and uniformly from ${1}$ to ${x}$, the random variables ${\mu(n+1),\ldots,\mu(n+k)}$ become asymptotically independent of each other (in the probabilistic sense) as ${x \rightarrow \infty}$. However, this is not quite accurate, because some moments (namely those with all exponents ${a_i}$ even) have the “wrong” asymptotic value, leading to some unwanted correlation between the two variables. For instance, the events ${\mu(n)=0}$ and ${\mu(n+4)=0}$ have a strong correlation with each other, basically because they are both strongly correlated with the event of ${n}$ being divisible by ${4}$. A more accurate interpretation of the Chowla conjecture is that the random variables ${\mu(n+1),\ldots,\mu(n+k)}$ are asymptotically conditionally independent of each other, after conditioning on the zero pattern ${\mu(n+1)^2,\ldots,\mu(n+k)^2}$; thus, it is the sign of the Möbius function that fluctuates like random noise, rather than the zero pattern. (The situation is a bit cleaner if one works instead with the Liouville function ${\lambda}$ instead of the Möbius function ${\mu}$, as this function never vanishes, but we will stick to the traditional Möbius function formalism here.)

A more recent formulation of the Möbius randomness heuristic is the following conjecture of Sarnak. Given a bounded sequence ${f: {\bf N} \rightarrow {\bf C}}$, define the topological entropy of the sequence to be the least exponent ${\sigma}$ with the property that for any fixed ${\varepsilon > 0}$, and for ${m}$ going to infinity the set ${\{ (f(n+1),\ldots,f(n+m)): n \in {\bf N} \} \subset {\bf C}^m}$ of ${f}$ can be covered by ${O( \exp( \sigma m + o(m) ) )}$ balls of radius ${\varepsilon}$ (in the ${\ell^\infty}$ metric). (If ${f}$ arises from a minimal topological dynamical system ${(X,T)}$ by ${f(n) := f(T^n x)}$, the above notion is equivalent to the usual notion of the topological entropy of a dynamical system.) For instance, if the sequence is a bit sequence (i.e. it takes values in ${\{0,1\}}$), then there are only ${\exp(\sigma m + o(m))}$ ${m}$-bit patterns that can appear as blocks of ${m}$ consecutive bits in this sequence. As a special case, a Turing machine with bounded memory that had access to a random number generator at the rate of one random bit produced every ${T}$ units of time, but otherwise evolved deterministically, would have an output sequence that had a topological entropy of at most ${\frac{1}{T} \log 2}$. A bounded sequence is said to be deterministic if its topological entropy is zero. A typical example is a polynomial sequence such as ${f(n) := e^{2\pi i \alpha n^2}}$ for some fixed ${\sigma}$; the ${m}$-blocks of such polynomials sequence have covering numbers that only grow polynomially in ${m}$, rather than exponentially, thus yielding the zero entropy. Unipotent flows, such as the horocycle flow on a compact hyperbolic surface, are another good source of deterministic sequences.

Conjecture 3 (Sarnak’s conjecture) Let ${f: {\bf N} \rightarrow {\bf C}}$ be a deterministic bounded sequence. Then

$\displaystyle \sum_{n \leq x} \mu(n) f(n) = o_{x \rightarrow \infty;f}(x).$

This conjecture in general is still quite far from being solved. However, special cases are known:

• For constant sequences, this is essentially the prime number theorem (1).
• For periodic sequences, this is essentially the prime number theorem in arithmetic progressions.
• For quasiperiodic sequences such as ${f(n) = F(\alpha n \hbox{ mod } 1)}$ for some continuous ${F}$, this follows from the work of Davenport.
• For nilsequences, this is a result of Ben Green and myself.
• For horocycle flows, this is a result of Bourgain, Sarnak, and Ziegler.
• For the Thue-Morse sequence, this is a result of Dartyge-Tenenbaum (with a stronger error term obtained by Maduit-Rivat). A subsequent result of Bourgain handles all bounded rank one sequences (though the Thue-Morse sequence is actually of rank two), and a related result of Green establishes asymptotic orthogonality of the Möbius function to bounded depth circuits, although such functions are not necessarily deterministic in nature.
• For the Rudin-Shapiro sequence, I sketched out an argument at this MathOverflow post.
• The Möbius function is known to itself be non-deterministic, because its square ${\mu^2(n)}$ (i.e. the indicator of the square-free functions) is known to be non-deterministic (indeed, its topological entropy is ${\frac{6}{\pi^2}\log 2}$). (The corresponding question for the Liouville function ${\lambda(n)}$, however, remains open, as the square ${\lambda^2(n)=1}$ has zero entropy.)
• In the converse direction, it is easy to construct sequences of arbitrarily small positive entropy that correlate with the Möbius function (a rather silly example is ${\mu(n) 1_{k|n}}$ for some fixed large (squarefree) ${k}$, which has topological entropy at most ${\log 2/k}$ but clearly correlates with ${\mu}$).

See this survey of Sarnak for further discussion of this and related topics.

In this post I wanted to give a very nice argument of Sarnak that links the above two conjectures:

Proposition 4 The Chowla conjecture implies the Sarnak conjecture.

The argument does not use any number-theoretic properties of the Möbius function; one could replace ${\mu}$ in both conjectures by any other function from the natural numbers to ${\{-1,0,+1\}}$ and obtain the same implication. The argument consists of the following ingredients:

1. To show that ${\sum_{n, it suffices to show that the expectation of the random variable ${\frac{1}{m} (\mu(n+1)f(n+1)+\ldots+\mu(n+m)f(n+m))}$, where ${n}$ is drawn uniformly at random from ${1}$ to ${x}$, can be made arbitrary small by making ${m}$ large (and ${n}$ even larger).
2. By the union bound and the zero topological entropy of ${f}$, it suffices to show that for any bounded deterministic coefficients ${c_1,\ldots,c_m}$, the random variable ${\frac{1}{m}(c_1 \mu(n+1) + \ldots + c_m \mu(n+m))}$ concentrates with exponentially high probability.
3. Finally, this exponentially high concentration can be achieved by the moment method, using a slight variant of the moment method proof of the large deviation estimates such as the Chernoff inequality or Hoeffding inequality (as discussed in this blog post).

As is often the case, though, while the “top-down” order of steps presented above is perhaps the clearest way to think conceptually about the argument, in order to present the argument formally it is more convenient to present the arguments in the reverse (or “bottom-up”) order. This is the approach taken below the fold.

— 1. Proof of proposition —

We first establish step 3 of the above outline.

Proposition 5 Assume the Chowla conjecture. Then for any ${m \geq 1}$, any ${\varepsilon}$, and any coefficients ${c_1,\ldots,c_m}$ bounded in magnitude by ${1}$, we have

$\displaystyle \mathop{\bf P}( |\frac{1}{m} \sum_{i=1}^m c_i \mu(n+i)| \geq \varepsilon ) \leq C \exp( - \varepsilon^2 m / C ) + o_{x \rightarrow \infty; m,\varepsilon}(1) \ \ \ \ \ (2)$

where ${C}$ is an absolute constant and ${o_{x \rightarrow \infty; m,\varepsilon}(1)}$ goes to zero as ${x \rightarrow \infty}$ for fixed ${m,\varepsilon}$ (uniformly in the choice of coefficients ${c_1,\ldots,c_m}$), and ${n}$ is drawn uniformly at random from ${1}$ to ${x}$.

Proof: We use the moment method. Let ${k}$ be a large even integer to be optimised in later. By Chebyshev’s inequality, we can bound the left-hand side of (2) by

$\displaystyle \frac{1}{(\varepsilon m)^k} \mathop{\bf E} |\sum_{i=1}^m c_i \mu(n+i)|^k;$

expanding out the ${k^{th}}$ power and using the triangle inequality, we can bound this by

$\displaystyle \frac{1}{(\varepsilon m)^k} \sum_{1 \leq i_1,\ldots,i_k \leq m} |\mathop{\bf E} \mu(n+i_1) \ldots \mu(n+i_k)|. \ \ \ \ \ (3)$

The summand here is always bounded by ${1}$. By Chowla’s conjecture, the summand can in fact be bounded by ${o_{n \rightarrow \infty; m}(1)}$ unless none of the indices ${i_1,\ldots,i_k}$ occur an odd number of times, so that the ${k}$ indices are in fact grouped into at most ${k/2}$ classes. So we are now facing the enumerative combinatorics problem of counting how many tuples ${(i_1,\ldots,i_k)}$ are of this form. We can estimate this count as follows. Reading the ${i_1,\ldots,i_k}$ from left to right, there are two cases: each ${j}$ is either “fresh” (in that ${i_j}$ is not equal to any of the ${i_1,\ldots,i_{j-1}}$), or a “repeat”. In the former case, there are at most ${m}$ choices for ${i_j}$; in the latter case, there are at most ${k}$. Also, at most ${k/2}$ of the cases are fresh, so once it is decided which indices ${j}$ are fresh or repeats, there are at most ${m^{k/2} k^{k/2}}$ remaining choices to be made (assuming that ${m \geq k}$). Thus the total count is bounded by ${2^k m^{k/2} k^{k/2}}$. Using this bound, we can thus upper bound (3) by

$\displaystyle (\frac{4k}{\varepsilon^2 m})^{k/2} + o_{n \rightarrow \infty; \varepsilon,m,k}(1).$

If we then optimise in ${k}$ by choosing ${k}$ to be the largest even integer less than ${\varepsilon^2 m/10}$ (say), we obtain the claim. $\Box$

Now let ${f}$ be a deterministic sequence, which we can normalise to be bounded to be real-valued and in magnitude by ${1}$. Let ${\varepsilon>0}$ and ${m \geq 1}$, and let ${f_\varepsilon}$ be ${f}$ rounded to the nearest multiple of ${\varepsilon}$ that is also bounded in magnitude by ${1}$., then from the zero-entropy hypothesis, there are at most ${\exp( o_{m \rightarrow \infty;\varepsilon,f}(m))}$ different values for the tuple ${(f_\varepsilon(n+1),\ldots,f_\varepsilon(n+m))}$, as ${n}$ ranges over the natural numbers. Let ${S_m}$ be the set of all such tuples. From the previous proposition and the union bound, we have

$\displaystyle \mathop{\bf P}( \sup_{(c_1,\ldots,c_m) \in S_m} |\frac{1}{m} \sum_{i=1}^m c_i \mu(n+i)| \geq \varepsilon )$

$\displaystyle \leq (C \exp( - \varepsilon^2 m / C ) + o_{x \rightarrow \infty; m,\varepsilon}(1)) \exp( o_{m \rightarrow \infty;\varepsilon,f}(m))$

and hence

$\displaystyle \mathop{\bf P}( |\frac{1}{m} \sum_{i=1}^m f_\varepsilon(n+i) \mu(n+i)| \geq \varepsilon )$

$\displaystyle \leq C \exp( - \varepsilon^2 m / C ) + o_{x \rightarrow \infty; m,\varepsilon}(1)) \exp( o_{m \rightarrow \infty;\varepsilon,f}(m)).$

The right-hand side can be simplified to

$\displaystyle \mathop{\bf P}( |\frac{1}{m} \sum_{i=1}^m f_\varepsilon(n+i) \mu(n+i)| \geq \varepsilon ) \leq \varepsilon + o_{x \rightarrow \infty; m,\varepsilon}(1)$

if ${m}$ is sufficiently large depending on ${\varepsilon,C}$. This in turn leads to the bound

$\displaystyle |\mathop{\bf E} \frac{1}{m} \sum_{i=1}^m f_\varepsilon(n+i) \mu(n+i) | \leq o_{x \rightarrow \infty; m,\varepsilon}(1) + 2\varepsilon$

since the expression inside the integrand is bounded in magnitude by ${1}$ (this is Step 2 of the sketch). But by approximate translation invariance we have

$\displaystyle \mathop{\bf E} f_\varepsilon(n+i) \mu(n+i) = \frac{1}{x} \sum_{n

for each ${1 \leq i \leq m}$, hence

$\displaystyle \mathop{\bf E} \frac{1}{m} \sum_{i=1}^m f_\varepsilon(n+i) \mu(n+i) = \frac{1}{x} \sum_{n

This gives (for a suitable choice of ${m}$)

$\displaystyle |\sum_{n

and thus

$\displaystyle |\sum_{n

letting ${\varepsilon}$ go to zero sufficiently slowly in ${x}$, we obtain the Sarnak conjecture.

Remark 6 The final part of this argument (Step 1 of the sketch) is very lossy: control of short-range correlations (such as ${\frac{1}{m} \sum_{i=1}^m f_\varepsilon(n+i) \mu(n+i)}$) can be easily averaged out to yield control of long-range correlations (such as those ${\frac{1}{x} \sum_{n), but it is very difficult to reverse the process and deduce short-range control from long-range control. Indeed, conjectures such as the Chowla conjecture, which control ${k}$-point correlations of an arithmetic function such as ${\mu}$ are generally considered to be significantly more difficult than conjectures such as the Sarnak conjecture, which involve only simple correlations of that function. (In particular, one can plan to tackle the Sarnak conjecture by using Cauchy-Schwarz type methods to eliminate the role of arithmetic functions ${\mu}$, as was discussed for instance in this blog post, but there is no obvious way to usefully eliminate arithmetic from the Chowla conjeture.)