On the Largest Prime factor of the k-generalized Lucas numbers
Abstract
Let (Ln(k))n≥ 2-k be the sequence of k--generalized Lucas numbers for some fixed integer k 2 whose first k terms are 0,…,0,2,1 and each term afterwards is the sum of the preceding k terms. For an integer m, let P(m) denote the largest prime factor of m, with P(0)=P( 1)=1. We show that if n k + 1, then P (Ln(k) ) > (1/86) n. Furthermore, we determine all the k--generalized Lucas numbers Ln(k) whose largest prime factor is at most 7.
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