On Palindromic forms in the k-Lucas sequence composed of two distinct Repdigits
Abstract
For integers k ≥ 2, the k-generalized Lucas sequence \Ln(k)\n ≥ 2-k is defined by the recurrence relation \[ Ln(k) = Ln-1(k) + ·s + Ln-k(k) for n ≥ 2, \] with initial terms given by L0(k) = 2, L1(k) = 1, and L2-k(k) = ·s = L-1(k) = 0. In this paper, we extend work in Lucas and show that the result in Lucas still holds for k 3, that is, we show that for k 3, there is no k-generalized Lucas number appearing as a palindrome formed by concatenating two distinct repdigits.
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