An explicit algebraic generating function for OEIS A348410

Abstract

For the OEIS sequence A348410, P. Bala recorded in February 2022 two equivalent closed forms, a(n) = [xn] ((1-x)(1-x2))-n and a single-index binomial sum. R. J. Mathar (October 2021) and V. Kotesovec (November 2021) each contributed a conjectured P-recursive recurrence -- Mathar's of order 4, Kotesovec's of order 2. We apply Lagrange-Bürmann inversion to Bala's [xn] form to derive the parametric expression A(t) = (1 - y2)/(1 - y - 4 y2), where y = y(t) is implicit by y(1-y)2(1+y) = t. Eliminating y via resultant gives the explicit algebraic equation P(t, A) = 0 of degree 4 in A and degree 2 in t. As an immediate corollary (Stanley's classical algebraic-implies-D-finite theorem), A(t) is D-finite. Mathar's and Kotesovec's specific recurrences are not directly proven here; we only verify Kotesovec's order-2 recurrence numerically for n = 3, …, 1000 and observe that an explicit ODE-and-recurrence extraction from P(t, A) = 0 via the standard Bostan-Chyzak-Salvy algebraic-to-holonomic procedure would close both conjectures. The supplementary archive contains a SymPy script which derives P(t, A) and checks the numerical evidence.