Residues of Terms of Lucas Sequences Modulo 3k
Abstract
The Fibonacci sequence defined by F0=0, F1=1, and Fn=Fn-1+Fn-2 has a shortest period length of 4· 3k-1 modulo 3k for every k∈N. In 2011, Bundschuh and Bundschuh bundschuh3 gave the frequencies of every residue 0≤ b≤ 3k-1 in this shortest period. In particular, their result implies that the Fibonacci sequences is not stable modulo 3. Here we extend this result to other Lucas sequences. More specifically, we give analogous results for Lucas sequences defined by (un)n with u0=0, u1=1, and un=Pun-1+un-2 for all n≥ 2, as well as Lucas sequences defined by (vn)n with v0=2, v1=P, and vn=Pvn-1+vn-2 for all n≥ 2. In particular, our result implies that none of these Lucas sequences are stable modulo 3 either.
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