On concatenations of two k-generalized Lucas numbers

Abstract

For an integer \( k ≥ 2 \), the sequence of \( k \)-generalized Lucas numbers is defined by the recurrence relation \( Ln(k) = Ln-1(k) + ·s + Ln-k(k) \) for all \( n ≥ 2 \), with initial conditions \( L0(k) = 2 \), \( L1(k) = 1 \) for all \( k ≥ 2 \), and \( L2-k(k) = ·s = L-1(k) = 0 \) for \( k ≥ 3 \). In this paper, we determine all \( k \)-generalized Lucas numbers that are concatenations of two terms of the same sequence and completely solve this problem for \( k ≥ 3 \). Our approach combines nonzero lower bounds for linear forms in logarithms, reduction techniques based on the Baker--Davenport method and the LLL-algorithm, together with continued fraction analysis and computational verification using SageMath.