A Proof of Bala's General-m Representation of the Harmonic Numbers

Abstract

For every nonzero integer m and every integer n 1, the nth harmonic number Hn = 1 + 12 + … + 1n satisfies the identity \[ Hn \;=\; 1m\,Σk=1n (-1)k+1k\, m kkn + (m-1)kn - k. \] The cases m = 1 and m = 2 are classical; for general nonzero integer m the identity was conjectured by P.~Bala in the OEIS entry A001008 in 2022 and remained open. We prove it here, working throughout in [[x]]. The proof reduces, via a substitution u = x/(1-x)m, to two formal-power-series identities: a Lagrange--B\"urmann evaluation of Σk1 mkk uk / k, and the fixed-point fact that under that substitution the unique solution v(u) of v = u(1-v)m is v = x. The argument extends verbatim to arbitrary complex m 0.