2.1. Davenport constant

Our argument depends on the Davenport constant, which is a group-theoretic invariant. Let G be a finite abelian multiplicative group with the identity element 1. Then the Davenport constant D(G) of the group G is the minimal integer such that every sequence of length D(G) from G has a sub-sequence whose product is equal to the identity elements of the group. A trivial bound of the Davenport constant is $D(G)\leq |G|$. Due to its various implications, from the decomposition of irreducible integers in the ideal class group (see [Reference Davenport8]) to the proof of the infinitude of Carmichael numbers (see [Reference Alford, Granville and Pomerance1]), a great deal of work has been done on obtaining the best possible bound of the Davenport constant. Let $\mathbb{M}_n$ denote the cyclic group of order n. Then any finite abelian group G can be written as $G=\mathbb{M}_{n_1}\times \mathbb{M}_{n_2}\times \cdots\times \mathbb{M}_{n_d}$ where $n_1, n_2, \dots, n_d$ are unique integers with $n_1\geq 2$ and $n_i\mid n_{i+1}$ for $1\leq i\leq d$. Here, the integers d and n_d are the rank and the exponent of the group G, respectively. If $G=\mathbb{M}_n$ is a cyclic group, then $D(G)=n$. This can be seen by just considering the sequence $(a,a,\cdots,a)$ where a is a generator of G. In [Reference Olson21, Reference Olson22], Olson proved that if G is a finite p-group then

(7)\begin{align} D(G)=(n_1+n_2+\cdots+n_d)-d+1, \end{align}

and $D(G)=n_1+n_2-1$ when the rank of G is 2. It is still unknown whether the equality equation (7) holds for any finite abelian group of rank greater than 2. Boas [Reference van Emde Boas27] and Gao [Reference Gao12] showed that equality equation (7) holds for a wide class of finite abelian groups of rank 3. In particular, finding the right size of Davenport constant is still an open problem. In [Reference Narkiewicz and Śliwa20], Narkiewicz conjectured that $D(G)\leq (n_1+n_2+\cdots+n_d)$. The best upper bound of D(G) is

(8)\begin{align} D(G)\leq \exp(G)\left(1+\log \frac{|G|}{\exp(G)}\right), \end{align}

which is due to Van Emde Boas and Kruyswijk [Reference van Emde Boas and Kruyswijk26], Meshulam [Reference Meshulam19], and Alford, Granville and Pomerance [Reference Alford, Granville and Pomerance1]. Here $\exp(G)$ is the the exponent of the group G. Various generalizations of the Davenport constant are studied in the literature.

Now we will define a generalization of the Davenport constant.

In the next lemma, we will give a non-trivial upper bound of $D^{(A)}(G)$.

Lemma 2.2. Let G be a finite abelian group and A be a subgroup of G. Then one has

\begin{align*} D^{(A)}(G) \le \exp(G) \left(1+\log \frac{|G|}{\exp(G)}-\frac{D(A)-1}{\exp(G)}\right). \end{align*}

Proof. It is enough to prove for a non-trivial subgroup A of G. Let e be the identity element. We will show that

(9)\begin{align} D^{(A)}(G)\leq D(G)-D(A)+1. \end{align}

Let $(a_1,a_2,\cdots,a_m)$ be a sequence from A of length $D(A)-1$ such that there is no sub-sequence whose product is e. To arrive a contradiction, we consider $D^{(A)}(G) \gt D(G)-D(A)+1$. Note that, by the definition $D^{(A)}(G)\leq D(G)$. Let $(x_1,x_2,\cdots,x_l)$ be a sequence of length $D^{(A)}(G)-1$ such that there is no sub-sequence whose product is in A. Next, we consider the sequence $(a_1,a_2,\cdots,a_m, x_1,x_2,\cdots,x_l)$. Since this sequence has length at least D(G) then there exists a sub-sequence $(a_{s_1}, a_{s_2},\cdots,a_{s_q},x_{r_1},x_{r_2},\cdots,x_{r_t})$ such that

\begin{align*} a_{s_1}a_{s_2}\dots a_{s_q}x_{r_1}x_{r_2}\dots x_{r_t}=e. \end{align*}

This shows $x_{r_1}x_{r_2}\dots x_{r_t}\in A$. This gives us a contradiction. Combining equation (9) with equation (8) we have the result of the lemma.

2.2. Smooth polynomial values

Consider the set of y-smooth integers

\begin{align*} S(x,y)=\{n\leq x: p^+(n)\leq y\}, \end{align*}

where $p^+(n)$ denotes the largest prime factor of n. It is well known that the cardinality of the set $S(x,y)$, which is denoted by $\Psi(x,y)$, is

\begin{align*} \Psi(x,y)=\left(1+o(1)\right)\rho(u)x, \end{align*}

where $u=\frac{\log x}{\log y}$ and ρ is the Dickman-de Brujin function satisfies the following differential equation:

\begin{align*} u\rho'(u)+\rho(u-1)=0. \end{align*}

We need the following asymptotic results. The most important special case of smooth number estimate is (see [Reference Granville16, p. 270])

Lemma 2.3. Let $L(x)=\exp(\sqrt{\log x\log\log x})$. Then

\begin{align*} \psi(x,L(x)^c)=\frac{x}{L(x)^{1/2c+o(1)}} \end{align*}

as $x\to\infty$.

One generalization of y-smooth number is polynomial values having prime factor no greater than y. Consider the polynomial ring $\mathbb{Z}[x]$. Let $P(x)\in \mathbb{Z}[x]$ and define the set

\begin{align*} S_P(x,y)=\{n\leq x: p^+\left(P(n)\right)\leq y\}. \end{align*}

Let $\Psi_P(x,y)$ denote the cardinality of the set $S_P(x,y)$. For a linear polynomial $P(x)=ax+q$ Chowla and Vijayaraghavan [Reference Chowla and Vijayaraghavan5] and Buchstab [Reference Buhštab4] gave an estimate of $\Psi_P(x,y)$ for a fixed f and u. Later, Ramaswami [Reference Ramaswami23] gave an uniform version of Buchstab’s results. Fouvry and Tenenbaum [Reference Fouvry and Tenenbaum11] and Granville [Reference Granville14, Reference Granville15] made significant improvement of Ramaswami’s uniform result. The following result can be found in [Reference Fouvry and Tenenbaum11, Reference Granville14, Reference Granville15]. See also Hildebrand and Tenenbaum [Reference Hildebrand and Tenenbaum18, Sec. 6]

Lemma 2.4. Let $(a,q)=1$ and $P(x)=ax+q$. Then

\begin{align*} \Psi_P(x,y)=\frac{x}{qu^{u+o(u)}}, \end{align*}

for $x\geq 3$, $1\leq u\leq e^{c\sqrt{\log y}}$, and $q\leq e^{c\sqrt{\log y}}$.

For degree 2 polynomial Balog ans Ruzsa [Reference Balog and Ruzsa2] gave bounds of $\Psi_P(x,y)$.

Lemma 2.5. Let $a, b\in \mathbb{Z}$ and $P(x)=x(ax+b)$. Then for all α > 0

\begin{align*} \Psi_P(x,x^{\alpha})\asymp_{P,\alpha}x. \end{align*}

For degree 2 irreducible polynomial we have little weaker result. Dartyge [Reference Dartyge7] showed that

Lemma 2.6. Let $P(x)=(x^2+1)$ and $\alpha \gt {\frac{149}{179}}$. Then

\begin{align*} \Psi_P(x,x^{\alpha})\asymp_{\alpha,P} x \end{align*}

holds for all large x.

Now, if $P(x)\in \mathbb{Z}$ is a completely reducible polynomial of any degree then Hildebrand [Reference Hildebrand17] computed bounds of $\Psi_P(x,y)$. In particular, Hildebrand [Reference Hildebrand17] proved the following. A set $A\subset \mathbb{N}$ is said to be stable if for each fixed $t\in \mathbb{N}$, $n\in A\Rightarrow tn\in A$. Define the lower asymptotic density of the set A by

\begin{align*} d(A)=\liminf_{x\to\infty}\frac{1}{x}\#\{n\leq x:n\in A\}. \end{align*}

Then

Lemma 2.7. Let $k\geq 2$ be an integer and $\alpha_k=\frac{k-2}{k-1}$. Then any stable set $A\subset \mathbb{N}$ with $d(A) \gt \alpha_k$ satisfies

\begin{align*} d(\{n:n+i \in A, i=0,1,2,\dots,k\}) \gt 0. \end{align*}

In particular if we take

\begin{align*} A=\{n:p^{+}(n) \gt y\}, \end{align*}

then for $P(x)=(x+1)(x+2)\cdots(x+k)$ and $\alpha \gt e^{-\frac{1}{k-1}}$ one has

(10)\begin{align} \Psi_P(x,x^{\alpha})\asymp_{\alpha,P} x \end{align}

for all large x.

3.1. Lower bound

Let $\mathbb{Q}_{+}$ be the set of all positive rational numbers and

\begin{align*} \mathbb{Q}_{+}^{\omega}=\{q^{\omega}:q \in \mathbb{Q}_{+}\} \end{align*}

for some positive integer ω which will be chosen later. Then $\mathbb{Q}_{+}/ \mathbb{Q}_{+}^{\omega}$ form a multiplicative group. Let y be a fixed positive integer and $\{p_1,p_2,\cdots,p_t\}$ are primes in $[1,y]$. Clearly, $t=\pi(y)$. Let us denote $\overline{p_i}$ be the image of the prime p_i in the quotient group $\mathbb{Q}_{+}/ \mathbb{Q}_{+}^{\omega}$ and G be the finite abelian subgroup of $\mathbb{Q}_{+}/ \mathbb{Q}_{+}^{\omega}$ generated by the elements $\{\overline{p_1}, \overline{p_2},\cdots,\overline{p_t}\}$. Hence,

(11)\begin{align} G\cong \underbrace{\mathcal{C}_{\omega}\times \mathcal{C}_{\omega}\times\cdots\times\mathcal{C}_{\omega}}_{t \mathrm{times}}., \end{align}

where $\mathcal{C}_{\omega}$ is the cyclic group of the order ω > 2. Let S be the set of all y-smooth integer from $[1,N]$ and $S_P=S\cap \{P(n):1\leq n\leq N\}$, where $P(x)=ax+q$. Let us consider $S_P=\{P(n_1), P(n_2), \cdots,P(n_s)\}$. Note that $\overline{P(n_i)}\in G$. Now we choose ω such that

(12)\begin{align} (\omega-1)y\log N\leq s. \end{align}

Clearly for large N, one has $s\geq \omega\pi(y)\log(\omega)-1=\omega t\log(\omega)-1\geq D^{(A)}(G)$ for some non-trivial subgroup A of G. Then by Lemma 2.2, there exists a subgroup A of G such that

\begin{align*} \overline{P(n_{r_1})}\cdot\overline{P(n_{r_2})}\cdots\overline{P(n_{r_k})}=\overline{b} \end{align*}

for some $\overline{b}\in A$ and hence

\begin{align*} {P(n_{r_1})}\cdot{P(n_{r_2})}\cdots{P(n_{r_k})}\in b\mathbb{Q}_{+}^{\omega}. \end{align*}

Therefore

\begin{align*} {P(n_{r_1})}\cdot{P(n_{r_2})}\cdots{P(n_{r_k})}= bl^{\omega}, \end{align*}

for some integer l with $\operatorname{gcd}(b,l)=1$. Now, form the right side of equation (12), one has

\begin{align*} \log\omega\geq \log s-\log y-\log\log N. \end{align*}

From the lemma 2.4 we can choose $y=\exp(\sqrt{\log N\log\log N/2})$ and hence $\log s=\log N-\log q-(u+o(u))\log u$. Therefore

\begin{align*} \log \omega&\geq \log N-\log q-(u+o(u))\log u-\sqrt{\log N\log\log N/2}-\log\log N\\ &\geq \log N-\log q-\frac{\log N}{\log y}(\log\log N-\log\log y)-\sqrt{\log N\log\log N/2}\\ &\hspace{8cm}-\log\log N+o(u)\log u\\ &\geq \log N-\log q-\sqrt{2\log N\log\log N}+o(\sqrt{\log N\log\log N}). \end{align*}

In the penultimate step above we have used the definition

\begin{align*} u=\frac{\log N}{\log y}. \end{align*}

Hence, we obtain

\begin{align*} \omega\geq \frac{N}{q\exp((\sqrt 2+o(1))\sqrt{\log N\log\log N})}. \end{align*}

3.2. Upper bound

Let us consider

\begin{align*} P(x_1)P(x_2)\cdots P(x_m)=bl^{\omega}, \end{align*}

and p be the largest prime factor of l ^ω. Clearly, p ^ω is a factor of $p^{\nu_p(bl^{\omega})}$. Here $\nu_p(x)$ is the p-adic valuation of the integer x. Next we consider the set

\begin{align*} A=\{P(n):P(n)\leq N, P(n)\text{ is }p\text{-smooth}, p\mid P(n)\}. \end{align*}

Hence $|A|\leq \psi_P(N/p,p)$. One can check if k is the largest value for which $p^k\leq N$ then $k\leq \log N/\log p$. Put all these information together with Lemma 2.4 we have

(13)\begin{align} \omega\leq \nu_p(bl^{\omega}) &\leq \psi_P\left(\frac{N}{p},p\right)\frac{\log N}{\log p}\nonumber\\ &\leq \frac{1}{q}L(p), \end{align}

where $L(p)=\frac{N}{p}v^{-v+o(v)}\frac{\log N}{\log p}$ and $v=\frac{\log N/p}{\log p}$. Now we will maximize the function L(p). Note that

(14)\begin{align} \log L(p)&=\log N-\log p\nonumber\\ &\quad+\left(1-\frac{\log N}{\log p}\right)\left(\log\log N-\log\log p+\log(1-\log p/\log N)\right)+o(v\log v). \end{align}

To maximize equation (14) one needs to choose p so that $\log p$ and

\begin{align*} \frac{\log N}{\log p}\left(\log\log N-\log\log p\right), \end{align*}

are of same size. Let us set

\begin{align*} p=\exp\left(\left(\frac{1}{\sqrt{2}}+o(1)\right)\sqrt{\log N\log\log N}\right). \end{align*}

Therefore

(15)\begin{align} \log p+\frac{\log N}{\log p}\left(\log\log N-\log\log p\right)&=\left(\frac{1}{\sqrt{2}}+o(1)\right)\sqrt{\log N\log\log N}\nonumber\\ &\quad+\frac{\log N}{2\log p}\log\log N+O\left(\sqrt{\log N\log\log N}\right)\nonumber\\ &=\left(\sqrt{2}+o(1)\right)\sqrt{\log N\log\log N}. \end{align}

Hence from equations (14) and (15) we have

(16)\begin{align} \operatorname{max}_p L(p)=N\exp\left(-\left(\sqrt{2}+o(1)\right)\sqrt{\log N\log\log N}\right). \end{align}

Substituting equation (16) in equation (13) will give the required upper bound.