2020
DOI: 10.1016/j.aam.2020.102040
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Stieltjes continued fractions related to the paperfolding sequence and Rudin-Shapiro sequence

Abstract: We investigate two Stieltjes continued fractions given by the paperfolding sequence and the Rudin-Shapiro sequence. By explicitly describing certain subsequences of the convergents P n (x)/Q n (x) modulo 4, we give the formal power series expansions (modulo 4) of these two continued fractions and prove that they are congruent modulo 4 to algebraic series in Z [[x]]. Therefore, the coefficient sequences of the formal power series expansions are 2-automatic. Write Q n (x) = i≥0 a n,i x i . Then (Q n (x)) n≥0 def… Show more

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Cited by 2 publications
(4 citation statements)
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“….17) for s = A(i, 0 2k ). We find that (A(i, 0 24 ), E 24 ) = (A(i, 0 16 ), E 16 ), so that we only have to verify that identities (2.12) through (2.17) hold for 2 ≤ k ≤ 12, which turns out to be true.…”
Section: Statement Of the Theorem Formentioning
confidence: 97%
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“….17) for s = A(i, 0 2k ). We find that (A(i, 0 24 ), E 24 ) = (A(i, 0 16 ), E 16 ), so that we only have to verify that identities (2.12) through (2.17) hold for 2 ≤ k ≤ 12, which turns out to be true.…”
Section: Statement Of the Theorem Formentioning
confidence: 97%
“…The authors [10] proved that the Stieltjes continued fractions defined by the Thue-Morse sequence and the perioddoubling sequence in Z [[x]] are congruent, modulo 4, to algebraic series in Z [[x]]. In 2020, Wu [16] obtained similar results concerning the Stieltjes continued fractions defined by the paperfolding sequence and the Golay-Shaprio-Rudin sequence.…”
mentioning
confidence: 89%
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