Proof. Since $\{1,\ldots , 2^k-1\}$ is a maximal k-Schreier set, no proper subset can be a maximal k-Schreier set. This proves that for each $n \in \{1,\ldots , 2^k-2\}$ , we have $r_{k,n}^0 = 0$ and $r_{k,2^k-1}^0 = 1$ . The equality $r_{k,2^k}^0 = 2^{k-1}-1$ follows from the fact that $\{1,\ldots , 2^k\}\setminus \{n\}$ is a maximal k-Schreier set for each $n \in \{2^{k-1}+1,\ldots , 2^k-1\}$ , and every such set is of this form. To compute $r_{k,2^k+1}^0$ , one can easily check that any set $F \in \mathcal {R}_{k,2^k+1}^0$ has initial segment $\{1, \ldots , 2^{k-2}\}$ and is made by either deleting two numbers from the set $\{2^{k-1}+1, \ldots , 2^{k}\}$ or deleting one number from $\{2^{k-2}+1,\ldots ,2^{k-1}\}$ .

Proof. Fix $k \in \mathbb {N}$ . The set $\{1,\ldots , 2^{k}-1\}$ is a maximal k-Schreier set. Therefore, every subset of $\{1,\ldots , 2^{k}-1\}$ is a k-Schreier set. Consequently, for each $n \in \{1,\ldots , 2^k-1\}$ , we have $s_{k,n} = 2^{n-1}$ . On the other hand, $\{1,\ldots , 2^{k}\}$ is not a k-Schreier set, but each of its proper subsets is k-Schreier. Thus, $s_{k,2^k} = 2^{2^k-1}-1$

We compute $s_{k,2^k+1}$ . We will show there are exactly $2^k+1$ subsets of $\{1,\ldots ,2^k+1\}$ with maximum element $2^k+1$ that are not in $k\mathcal {S}$ . Let F be such a set and assume the case that $F\not =\{1,\ldots ,2^k+1\}$ .

First observe that $\{1,\ldots ,2^{k-1}\} \subset F$ . Indeed, if this were not the case, then $\min E_k(F)>2^{k-1}$ , which implies that $\max E_k(F)\geqslant 2^{k}+1$ . Hence, since $F\not \in k\mathcal {S}$ , $\max F>2^k+1$ , which is a contradiction. Therefore, $\min E_k(F)=2^{k-1}$ , and since $2^k-1 \leq \max E_k(F)<2^k+1$ , it follows that $F= \{1, \ldots , 2^k+1\}\setminus \{n\}$ for each ${n \in \{2^{k-1} + 1,\ldots ,2^k\}}$ . Including the case that $F=\{1, \ldots ,2^k+1\}$ . We have a total of $2^k+1$ many such sets. This is the desired result.

Proof. We proceed by induction on k. Since $p_2(x)=x^4-2x^3+x -1$ , the base case $k=2$ holds. Fix some integer k with $k\geqslant 3$ and assume the identities hold for $k-1$ . Let $m=2^{k-1}$ . Then

$$ \begin{align*}p_k(x) = p_{k-1}(x(x-1)) = x^m (x-1)^m - \frac{m}{2}x^{m-1}(x-1)^{m-1} + \cdots .\end{align*} $$

By inspection of the leading coefficients and using the binomial theorem, we have

$$ \begin{align*}p_k(x) = x^{2m} -mx^{2m-1} + \bigg(\, \binom{m}{2} - \frac{m}{2}\bigg)x^{2m-2} + \cdots .\end{align*} $$

This completes the inductive step of the proof.

Proof. Direct calculation using the above lemmas shows that the first three sums are 0. For the final identity, notice first that $p_k(2)=1$ for each $k \in \mathbb {N}$ . Thus using the identities in Lemmas 3.3 and 3.4,

$$ \begin{align*} 0 & =p_k(2)-1 = d^k_0 + d^k_1 2 + \cdots + d^k_{2^k-1}(2^{2^k-1}-1) + d^k_{2^k}2^{2^k}-1+d^k_{2^k-1} \\ & = d^k_0 + d^k_1 2 + \cdots + d^k_{2^k-1}(2^{2^k-1}-1) +d^k_{2^k}(2^{2^k}-2^{k-1}-1) = \sum_{i=0}^{2^k} d^k_{i} s_{k,i+1}.\\[-46.2pt] \end{align*} $$

Proof. We proceed by induction. We shall prove that for each $n\in \mathbb {N}$ , any Pascal-like set satisfies (4.1). For $n = 1$ , the assertion is clearly satisfied. Fix $n \geqslant 2$ and assume that (4.1) holds, replacing n with $n-1$ for any Pascal-like set. Fix a Pascal-like set $\{r_{i}^{j}:i \in \mathbb {N}, j\in \{1,\ldots , i-1\}\}$ and define $b_{i}^{j} = r_{i+1}^{j+1}$ . Then $\{b_{i}^{j}:i \in \mathbb {N}, j\in \{0,\ldots , i-1\}\}$ is also a Pascal-like set. By the inductive assumption,

$$ \begin{align*} r_{n}^{n-1} = b_{n-1}^{n-2} &= \sum_{j=0}^{n-2} (-1)^{n-2-j} \binom{n-2}{j} b_{n-1+j}^{0} = \sum_{j=0}^{n-2} (-1)^{n-2-j} \binom{n-2}{j} r^1_{n+j} \\ &= \sum_{j=0}^{n-2} (-1)^{n-2-j} \binom{n-2}{j} (r^0_{n+j+1} - r^0_{n+j}) \\ &= \sum_{j=1}^{n-1} (-1)^{n-1-j} \binom{n-2}{j-1} r^0_{n+j} + \sum_{j=0}^{n-2} (-1)^{n-1-j} \binom{n-2}{j} r^0_{n+j} \\ &= \sum_{j=0}^{n-1} (-1)^{n-1-j} \binom{n-1}{j} r^0_{n+j}. \end{align*} $$

Notice that, in the fourth equality, we used the definition of a Pascal-like set.

Proof. We sketch the easy proof. The Pascal-like property yields $r^{i-1}_{i+2} =r^{i-1}_{i+1} + r^{i}_{i+1}$ for each $i \in \mathbb {N}$ . It is clear that $(r^{i-1}_{i+2})_{i=1}^\infty $ must satisfy the same recursions as both $(r_{i}^{i-1})_{i=1}^\infty $ and $(r_{i+1}^{i-1})_{i=1}^\infty $ . Using this observation as the base case for an inductive argument, the general case follows.

Proof. Let $p(x) = c_kx^k + c_{k-1}x^{k-1} + \cdots c_1x+ c_0$ . Let $(d_i)_{i=0}^{2k}$ be defined by $p(x(x-1))=\sum _{i=0}^{2k}d_{i}x^{i}$ . It suffices to show that for each nonnegative integer $\ell $ ,

$$ \begin{align*} \sum_{i=1}^{2k+1}d_{i-1}r^0_{\ell+i} =0. \end{align*} $$

Fix some nonnegative integer $\ell $ . From the definition, $\{r^j_{\ell +i}: i \in \mathbb {N}, j \in \{0, \ldots ,i-1\}\}$ is Pascal-like. Therefore, by Lemma 4.2, $\sum _{i=0}^kc_ir^i_{\ell +i+1} = 0$ . Using Lemma 4.1, we rewrite this sum as

(4.2) $$ \begin{align} 0=\sum_{i=0}^kc_ir^i_{\ell+i+1}= \sum_{i=0}^k c_i \sum_{j=0}^{i} (-1)^{i-j} \binom{i}{j} r^0_{\ell+i+1+j}. \end{align} $$

Since (4.2) is satisfied, there are coefficients $(d^{\prime }_i)_{i=0}^{2k}$ such that $\sum _{i=1}^{2k+1}d^{\prime }_{i-1}r^0_{\ell +i}=0$ (for each nonnegative integer $\ell $ ). We wish to show that $d^{\prime }_i=d_i$ . Rather than a messy calculation, a simple way to see this is by converting to the characteristic polynomial and matching the coefficients. That is, replace $r^0_{\ell +\alpha }$ by $x^{\alpha -1}$ in (4.2) and apply the binomial theorem to obtain

$$ \begin{align*}\sum_{i=0}^k c_i \sum_{j=0}^{i} (-1)^{i-j} \binom{i}{j} x^{i+j}= \sum_{i=0}^k c_i x^i(x-1)^i= p(x(x-1))=\sum_{i=0}^{2k}d_{i}x^{i}.\end{align*} $$

Therefore, $d^{\prime }_i=d_i$ as desired.

Proof. Set all the notation as in the statement of the lemma. We proceed by induction to show that for each nonnegative integer $\ell $ ,

(4.4) $$ \begin{align} \sum_{j=1}^{2k+1}d_{j-1} t_{\ell+j}=0. \end{align} $$

The base case of the induction $\ell =0$ is just (4.3).

Suppose that for some $\ell \geqslant 0$ , (4.4) holds. We will show that (4.4) holds for $\ell +1$ . By Lemma 4.3, $(r^0_i)_{i=1}^\infty $ satisfies the recurrence relation with characteristic polynomial $p(x(x-1))$ . Using this fact and the induction hypothesis,

$$ \begin{align*} \begin{split} \sum_{j=1}^{2k+1}d_{j-1} t_{\ell+1+j} & = \sum_{i=1}^{2k+1}d_{j-1} (t_{\ell+1+j}-t_{\ell+j}) +\sum_{i=1}^{2k+1}d_{j-1} t_{\ell+j}\\ & =\sum_{j=1}^{2k+1}d_{j-1} r^0_{\ell+1+j} +\sum_{j=1}^{2k+1}d_{j-1} t_{\ell+j}=0 +0 =0. \end{split} \end{align*} $$

This completes the proof.

Proof. First, recall that the upper index $0$ in the expression $r_{k,n}^0$ indicates counting maximal $k\mathcal {S}$ sets. Observe that every element of $\mathcal {R}_{k+1,n+1}^{n}$ is the union of two sets. The first is a maximal $k\mathcal {S}$ set with a maximum at most $n-1$ . The second is $\{n+1\}$ . Consider the map

$$ \begin{align*} \mathcal{R}_{k+1,n+1}^{n} \ni F \mapsto F \backslash \{n+1\} \in \bigcup_{i=1}^{n} \mathcal{R}_{k,i}^0.\end{align*} $$

The map is clearly bijective (i can be interpreted as the second largest element of F) and the families under the union in the codomain are pairwise disjoint.

Proof. Define

$$ \begin{align*} \mathcal{T}_1 := \{F \in \mathcal{R}_{k,n}^{d} :n-1 \in F\}, & \quad \mathcal{T}_2 := \{F \in \mathcal{R}_{k,n}^{d} : n-1 \notin F\},\\ \mathcal{T}_1' := \{F \backslash \{n\} : F \in \mathcal{T}_1 \}, & \quad \mathcal{T}_2' := \{F \backslash \{n\} \cup \{n-1\} :F \in \mathcal{T}_2 \}. \end{align*} $$

Clearly, we have $|\mathcal {T}_1|=|\mathcal {T}_1'|$ and $|\mathcal {T}_2|=|\mathcal {T}_2'|$ . Hence, $r_{k,n}^d = |\mathcal {T}_1| + |\mathcal {T}_2| = |\mathcal {T}_1'| + |\mathcal {T}_2'|$ . Consider some $F \in \mathcal {R}_{k,n}^d$ . We claim that $|E_k(F)|> 1$ . If $E_k(F) = \{n\}$ , then $d_k(F) = n - 1$ , but we assumed that $d < n-1$ , which is a contradiction. Comparing the sets $E_k(F)$ and $E_k(F')$ , where $F'$ is the set F modified in one of two presented ways, it can be easily checked that $\mathcal {T}_1' = \mathcal {R}_{k,n-1}^{d+1}$ and $\mathcal {T}_2' = \mathcal {R}_{k,n-1}^d$ . This concludes the proof of the first part.

We will show that for each $n \in \mathbb {N}$ , we have $\mathcal {R}_{k,n+1}^{n-1}=\emptyset $ . We know that if $F \in \mathcal {R}_{k,n+1}^{n-1}$ we have $n+1 \in E_k(F)$ and, by definition, $d_k(F)=n-1$ . We obtain contradictions for all possible values of $\min E_k(F)$ . If $\min E_k(F)\leqslant n$ , using $n+1\in E_k(F)$ , we have ${d_k(F)\leqslant n-2}$ . If $n+1=\min E_k(F)$ , then $d_k(F)= n$ .

Proof. Define

$$ \begin{align*} \mathcal{T}_1 := \{F \cup \{n\} : F \in (k\mathcal{S})^{n-1} \backslash \mathcal{R}_{k,n-1}^0 \}, \quad \mathcal{T}_2 := \{F \backslash \{n-1\} \cup \{n\} : F \in (k\mathcal{S})^{n-1} \}. \end{align*} $$

We claim that $(k\mathcal {S})^n = \mathcal {T}_1 \cup \mathcal {T}_2$ . Then, by the fact that $\mathcal {T}_1 \cap \mathcal {T}_2 = \emptyset $ , we obtain

$$ \begin{align*}s_{k,n} = |(k\mathcal{S})^n| = |\mathcal{T}_1| + |\mathcal{T}_2| = (s_{k,n-1} - r_{k,n-1}^0) + s_{k,n-1}.\end{align*} $$

For each $G \in (k\mathcal {S})^n$ we have $F = G \backslash \{n\} \cup \{n - 1\} \in (k\mathcal {S})^{n-1}$ . If $n-1 \in G$ , then $F=G\setminus \{n\}$ . Since $G \in (k\mathcal {S})^n$ , F is not a maximal k-Schreier set. Hence, $G \in T_1$ . If $n-1 \not \in G$ , then $G \in T_2$ . It follows that $(k\mathcal {S})^n \subset \mathcal {T}_1 \cup \mathcal {T}_2$ . The inclusion $\mathcal {T}_2 \subset (k\mathcal {S})^n$ is obvious. It suffices to prove that $\mathcal {T}_1 \subset (k\mathcal {S})^n$ ; however, this is almost obvious. Adding one element larger than the maximum to a nonmaximal k-Schreier set produces a k-Schreier set.

Proof of Theorem 1.1.

We claim that for each $k \in \mathbb {N}$ , the sequence $(s_{k,n})$ satisfies a linear recurrence with characteristic polynomial $p_k(x)$ . This claim has already been established in the previous work for $k=1$ ; however, we will not use this statement directly. Instead, we prove the following statement holds for each natural number k.

1. (P _k ): The sequences $(r^0_{k,i})_{i=1}^\infty , (t_{k,i})_{i=1}^\infty $ satisfy a linear recurrence with characteristic polynomial $p_k(x)$ .

Consider the base case $k=1$ . Note that $r_{1,n}^{n-1}=1$ for each $n\in \mathbb {N}$ since $F \in \mathcal {R}_{1,n}^{n-1}$ if and only if $F=\{n\}$ . Therefore, $(r_{1,n}^{n-1})$ satisfies a linear recurrence with characteristic polynomial $p_0(x)=x-1$ and the same holds for $(r_{1,n+1}^{n-1})_{n=1}^\infty $ since this sequence is identically 0 (Lemma 5.2). Therefore, by Lemma 4.3, $(r^0_{1,i})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_0(x(x-1))=x(x-1)-1=p_1(x)$ . Notice that (4.3) is satisfied by Lemma 3.5 for $k=1$ . Therefore, we may apply Lemma 4.4 to see that $(t_{1,i})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_1(x)$ . Therefore, (P $_1$ ) holds.

Fix a positive integer k and assume that (P $_k$ ) holds; we will prove that (P $_{k+1}$ ) holds. By Lemma 5.1, $t_{k,i}=r_{k+1,i+1}^i$ for each $i \in \mathbb {N}$ . Therefore, $(r_{k+1,i+1}^i)_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_k(x)$ . We want to show that $(r_{k+1,i}^{i-1})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_k(x)$ ; this is just the sequence in the previous sentence starting with $r_{k+1,1}^0$ . Notice that $r_{k+1,1}^0=0$ . Therefore, by Lemma 3.5,

$$ \begin{align*}\sum_{i=0}^{2^k} d^k_{i}r_{k+1,i+1}^i = \sum_{i=1}^{2^k} d^k_{i}t_{k,i}=0.\end{align*} $$

Therefore, the initial conditions are satisfied and so $(r_{k+1,i}^{i-1})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_k(x)$ .

By Lemma 5.2, $r_{k+1,i+1}^{i-1}=0$ for each $i \in \mathbb {N}$ . Thus we may apply Lemma 4.3 to conclude that $(r^0_{k+1,i})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_{k+1}(x)$ . In addition, by Lemma 3.5, the assumptions of Lemma 4.4 are satisfied, so $(t_{k+1,i})_{i=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_{k+1}(x)$ . This concludes the inductive step.

Fix $k\in \mathbb {N}$ . It remains to prove that $(s_{k,n})_{n=1}^\infty $ satisfies a linear recurrence with characteristic polynomial $p_{k}(x)$ . It suffices to show that for each nonnegative integer $\ell $ ,

(5.1) $$ \begin{align} \sum_{i=0}^{2^k}d^k_{i} s_{k,\ell+i+1} =0. \end{align} $$

By Lemma 3.5, the $\ell =0$ case holds. Suppose (5.1) holds for some nonnegative $\ell $ . Using Lemma 5.3 and the statement (P $_k$ ), we have

$$ \begin{align*} \sum_{i=0}^{2^k}d^k_{i} s_{k,\ell+i+2} = 2\sum_{i=0}^{2^k}d^k_{i} s_{k,\ell+i+1 } - \sum_{i=0}^{2^k} d^k_i r^0_{k,\ell+i+1} =0-0. \end{align*} $$

This finishes the proof of the theorem. Note that Corollary 1.2 follows from the initial induction in the proof for the statements (P $_k$ ).

Problem 6.1. Is the sequence $(|\mathcal {S}_2^n|)_{n=1}^\infty $ a linear recurrence sequence? If yes, then what is the recursive relation?