Mersenne Numbers in Generalized Lucas Sequences
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Published:2024-01-29
Issue:1
Volume:77
Page:3-10
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ISSN:2367-5535
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Container-title:Proceedings of the Bulgarian Academy of Sciences
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language:
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Short-container-title:C. R. Acad. Bulg. Sci.
Author:
Altassan Alaa,Alan Murat
Abstract
Let $$k \geq 2$$ be an integer and let $$(L_{n}^{(k)})_{n \geq 2-k}$$ be the $$k$$-generalized Lucas sequence with certain initial $$k$$ terms and each term afterward is the sum of the $$k$$ preceding terms. Mersenne numbers are the numbers of the form $$2^a-1$$, where $$a$$ is any positive integer. The aim of this paper is to determine all Mersenne numbers which lie inside $$k$$-Lucas sequences.
Publisher
Prof. Marin Drinov Publishing House of BAS (Bulgarian Academy of Sciences)