On divisibility concerning binomial coefficients

TL;DR

This paper investigates divisibility properties of binomial coefficients and Catalan numbers, establishing several new divisibility relations involving these combinatorial quantities for positive integers.

Contribution

It introduces new divisibility theorems connecting binomial coefficients and Catalan numbers, extending known results with novel divisibility conditions.

Findings

Proves divisibility of binomial coefficients by linear functions of n.

Establishes divisibility relations involving Catalan numbers of various orders.

Provides explicit divisibility conditions for combinations of binomial and Catalan numbers.

Abstract

Let k and n be positive integers. We mainly show that $$(ln+1) | k\binom{kn+ln}{kn},$$ $$2\binom{kn}n | \binom {2n}{n}C_{2n}^{(k-1)}$$, $$\binom{kn}n | (2k-1)C_n\binom{2kn}{2n},$$ $$\binom{2n}n | (k+1)C_n^{(k-1)}\binom{2kn}{kn},$$ $$2^{k-1}\binom{2n}{n} | \binom{2(2^k-1)n}{(2^k-1)n}C_n^{(2^k-2)},$$ $$(6n+1)\binom{5n}{n} | \binom{3n-1}{n-1}C_{3n}^{(4)},$$ and $$\binom{3n}{n} | \binom{5n-1}{n-1}C_{5n}^{(2)},$$ where C_n denotes the Catalan number $\binom{2n}{n}/(n+1)$, and C_m^{(h)} refers to the Catalan number $\binom{(h+1)m}{m}/(hm+1)$ of order h.