On a Variant of Pillai's problem involving convergent denominators of quadratic irrationals

Abstract

Let (qα, n)n ≥ 0 be the sequence of convergent denominators to the simple continued fraction expansion of α. For certain specific choices of α, this sequence is a Lehmer sequence. In this paper, we show that there are only finitely many integers c such that the equation qα, n - qβ, m = c has at least two distinct solutions (n,m), where α,β are quadratic irrationals with Q(α)≠ Q(β). In specific instances, we solve the equation qα, n - qβ, m = c completely and explicitly list all solutions.