A formula for the r-coloured partition function in terms of the sum of divisors function and its inverse

Abstract

Let p-r(n) denote the r-coloured partition function, and σ(n)=Σd|nd denote the sum of positive divisors of n. The aim of this note is to prove the following p-r(n)=θ(n)+\,Σk=1n-1rk+1(k+1)! Σα1\,= kn-1 \, Σα2\,= k-1α1-1 ·s Σαk\, = 1αk-1-1θ(n-α1) θ(α1 -α2) ·s θ(αk-1-αk) θ(αk) where θ(n)=n-1\, σ(n), and its inverse σ(n) = n\,Σr=1n (-1)r-1r\, nr\, p-r(n).