On the set of zero coefficients of a function satisfying a linear differential equation

Abstract

Let K be a field of characteristic zero and suppose that f:N K satisfies a recurrence of the form f(n)\ =\ Σi=1d Pi(n) f(n-i), for n sufficiently large, where P1(z),...,Pd(z) are polynomials in K[z]. Given that Pd(z) is a nonzero constant polynomial, we show that the set of n∈ N for which f(n)=0 is a union of finitely many arithmetic progressions and a finite set. This generalizes the Skolem-Mahler-Lech theorem, which assumes that f(n) satisfies a linear recurrence. We discuss examples and connections to the set of zero coefficients of a power series satisfying a homogeneous linear differential equation with rational function coefficients.