Higher Order Fibonacci Sequences from Generalized Schreier sets

TL;DR

This paper generalizes the Fibonacci sequence through higher order sequences derived from Schreier sets, establishing new linear recurrence relations for these sequences and exploring their interrelationships.

Contribution

It introduces higher order Fibonacci-like sequences based on generalized Schreier sets and derives their linear recurrence relations, extending known results.

Findings

Sequences follow higher order linear recurrence relations.

Established recurrence relations for sequences with additional constraints.

Discovered relationships between different generalized Schreier set sequences.

Abstract

A Schreier set $S$ is a subset of the natural numbers with $\min S\ge |S|$. It has been known that the sequence $(a_{1,n})$, where $$a_{1,n}\ :=\ |\{S\subseteq \mathbb{N}\,:\,\max S = n\mbox{ and } \min S \ge |S|\}|,$$ is the Fibonacci sequence. Generalizing this result, we prove that for all $p\in \mathbb{N}$, the sequence $(a_{p,n})$, where $$a_{p, n} \ :=\ |\{S\subseteq \mathbb{N}\,:\,\max S = n\mbox{ and } \min S\ge p|S|\}|,$$ has a linear recurrence relation of higher order. We investigate further by requiring that ${\rm min}_2 S\ge q |S|$, where $\min_2 S$ is the second smallest element of $S$. We prove a linear recurrence relation for the sequence $(a_{p, q, n})$, where $$a_{p, q, n} \ :=\ |\{S\subseteq \mathbb{N}\,:\,\max S = n, \min S \ge p|S|\mbox{ and } {\rm min}_2 S\ge q|S|\}|,$$ and discuss a curious relationship between $(a_{q, n})$ and $(a_{p, q, n})$.