Three short proofs of Mathar's 2014 conjecture for OEIS A002627

Abstract

For the OEIS sequence A002627, defined by the inhomogeneous first-order recurrence a(n) = n\,a(n-1) + 1 with a(0) = 0, R.~J.~Mathar recorded in February 2014 the conjectured second-order homogeneous recurrence \[ a(n) - (n+1)\,a(n-1) + (n-1)\,a(n-2) = 0, n 2, \] which has remained marked as a conjecture on the OEIS for over a decade. We give three short proofs. The first is two lines: subtract the defining recurrence at adjacent indices and the constant cancels (we call this homogenisation). The second reads off the same relation from the exponential generating function F(x) = (ex-1)/(1-x). The third is a Pascal-rule telescoping on the binomial-sum form a(m) = Σk=0m-1 k!mk. All three derivations are elementary, requiring nothing beyond undergraduate techniques. We remark that the same homogenisation trick clears an entire class of ``Conjecture: …'' entries on the OEIS, namely sequences satisfying a(n) = p(n)\,a(n-1) + q(n) with simple q.