2018
DOI: 10.5802/jtnb.1022
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Note on the Stern-Brocot sequence, some relatives, and their generating power series

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“…In terms of the polynomial coefficients in (1.1), r(z) = −a 1 (z)/a 0 (z). Due to this product representation, degree-one Mahler functions have been widely studied (see [5][6][7][8]14] for some recent work). Some of the strongest results in this area concern this class of functions: degree-one Mahler functions are either rational or hypertranscendental, that is, they do not satisfy algebraic differential equations with polynomial coefficients [4].…”
Section: Introductionmentioning
confidence: 99%
“…In terms of the polynomial coefficients in (1.1), r(z) = −a 1 (z)/a 0 (z). Due to this product representation, degree-one Mahler functions have been widely studied (see [5][6][7][8]14] for some recent work). Some of the strongest results in this area concern this class of functions: degree-one Mahler functions are either rational or hypertranscendental, that is, they do not satisfy algebraic differential equations with polynomial coefficients [4].…”
Section: Introductionmentioning
confidence: 99%