On the k-regularity of the k-adic valuation of Lucas sequences
Journal de théorie des nombres de Bordeaux, Tome 30 (2018) no. 1, pp. 227-237.

Pour tous entiers k2 et n0, soit ν k (n) le plus grand entier positif e tel que k e divise n. De plus, soit (u n ) n0 une suite de Lucas non dégénérée telle que u 0 =0, u 1 =1 et u n+2 =au n+1 +bu n , pour certains entiers a et b. Shu et Yao ont montré que, pour tout nombre premier p, la suite ν p (u n+1 ) n0 est p-régulière. Medina et Rowland ont déterminé le rang de ν p (F n+1 ) n0 , où F n est le n-ième nombre de Fibonacci.

Nous montrons que si k et b sont premiers entre eux, alors ν k (u n+1 ) n0 est une suite k-régulière. Si de plus k est un nombre premier, nous déterminons aussi le rang de cette suite. En outre, nous donnons des formules explicites pour ν k (u n ), généralisant un théorème précédent de Sanna concernant les valuations p-adiques des suites de Lucas.

For integers k2 and n0, let ν k (n) denote the greatest nonnegative integer e such that k e divides n. Moreover, let (u n ) n0 be a nondegenerate Lucas sequence satisfying u 0 =0, u 1 =1, and u n+2 =au n+1 +bu n , for some integers a and b. Shu and Yao showed that for any prime number p the sequence ν p (u n+1 ) n0 is p-regular, while Medina and Rowland found the rank of ν p (F n+1 ) n0 , where F n is the n-th Fibonacci number.

We prove that if k and b are relatively prime then ν k (u n+1 ) n0 is a k-regular sequence, and for k a prime number we also determine its rank. Furthermore, as an intermediate result, we give explicit formulas for ν k (u n ), generalizing a previous theorem of Sanna concerning p-adic valuations of Lucas sequences.

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DOI : 10.5802/jtnb.1025
Classification : 11B37, 11B85, 11A99
Mots clés : Lucas sequence, Fibonacci numbers, $p$-adic valuation, $k$-regular sequence, automatic sequence
Murru, Nadir 1 ; Sanna, Carlo 1

1 Università degli Studi di Torino Department of Mathematics Via Carlo Alberto 10 10123 Torino, Italy
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Murru, Nadir; Sanna, Carlo. On the $k$-regularity of the $k$-adic valuation of Lucas sequences. Journal de théorie des nombres de Bordeaux, Tome 30 (2018) no. 1, pp. 227-237. doi : 10.5802/jtnb.1025. http://archive.numdam.org/articles/10.5802/jtnb.1025/

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