The quotient problem for linear recurrence sequences

Abstract

Let \U(m)\m∈ and \V(n)\n∈ be linear recurrence sequences. It is a well-known Diophantine problem to determine the finiteness of the set of natural numbers n such that the ratio U(n)/V(n) is an integer. We study the finiteness problem for the set (m, n)∈ N2 such that there exist non-zero positive integers dm, n satisfying |dm, n|=o(n), and dm, nU(m)/V(n) is an element from a finitely generated subring of . In particular, we prove that for m≠ n , there exists a polynomial P such that dm, nP(n)U(m)/V(n) is a multi-recurrence and V(n)/P(n) is a linear recurrence and for m=n both dm, nP(n)U(m)/V(n) and V(n)/P(n) are linear recurrences. To prove our results, we employ Schmidt's subspace theorem, and the concept of moving hyperplanes, moving polynomials, and moving points.