Linear recurrence sequences and twisted binary forms
Abstract
Let Πi=1d (X-αi Y) ∈ C[X,Y] be a binary form and let ε1,…,εd be nonzero complex numbers. We consider the family of binary forms Πi=1d (X-αi εiaY), a∈ Z, which we write as Xd-U1(a)Xd-1Y+·s+(-1)d-1 Ud-1(a) XYd-1+(-1)d Ud(a) Yd. In this paper we study these sequences (Uh(a))a∈ Z which turn out to be linear recurrence sequences.
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