Paperfolding, Automata, and Rational Functions - Diagonals and ...

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Diagonals of Rational Functions Now consider the class of power series in Q[[x]] which occur as the diagonals of rational functions f (x) = P(x)/Q(x) with Q(0) = 0 . Every algebraic power series is the diagonal of a rational power series, and every such diagonal is algebraic mod p s for all s and almost all p. The complete diagonals of rational power series have many other interesting properties: Theorem. If f (x1) is the diagonal of a rational power series over Q (i) f has positive radius of convergence rp at every place p of Q and rp = 1 for almost all p . (ii) for almost all p the function f is bounded on the disc Dp(1 − ) = {t ∈ Cp : |t| < 1} , where Cp is the completion of the algebraic closure of the p-adic rationals Qp and, for almost all p , sup{|f (t)| : t ∈ Dp(1 − )} = 1 . (iii) f satisfies a linear differential equation over Q[x1]; and (iv) this equation is a Picard-Fuchs equation. 37
Whilst (i) and (ii) are reasonably straightforward, (iii) and (iv) are more difficult and are proved by Deligne using resolution of singularities. Dwork has given a proof which avoids resolution. An elementary proof of (iii) and its generalisations is given by Lipshitz: Leonard argues so as to show D -finiteness is retained under the taking of diagonals: roughly speaking, the vector space generated by the partial derivatives of an algebraic power series remains finite dimensional. I conclude by mentioning Grothendieck’s Conjecture: If a linear homogeneous differential equation with coefficients from Q[x1] , and of order n , has, for almost all p , n independent solutions in Fp[[x1]] then all its solutions are algebraic. This has been proved in a number of special cases (for example, for Picard-Fuchs equations) by Katz. Some results have also been obtained by elementary methods by Honda. 38
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Paperfolding, Automata, and Rationa
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Paperfolding, Automata, and Rationa
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Paperfolding Take a rectangular she
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A Mahler Functional Equation Aside.
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Next, if we pair the sequence Regul
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Next, if we pair the sequence Regul
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The uniform, or regular, 2-substitu
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Characteristic Functions I found th
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An Algebraic Equation in Characteri
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These remarks show that the paperfo
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These remarks show that the paperfo
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The Thue-Morse Sequence 0 1 10 11 1
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The Thue-Morse Sequence 0 1 10 11 1
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Euler’s Identity and a Functional
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An Algebraic Equation The function
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A Counter-example in Analysis I cla
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The Shapiro Sequence Consider, the
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A Remark on the Shapiro Function Se
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Transcendence of Automatic Numbers
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Complexity of a Sequence Given an i
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Complexity of a Sequence Given an i
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Algebraicity and Automaticity The p
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Comments on the Proof The best proo
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But for expansions over the complex
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Power Series in Several Variables R
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Diagonals and Hadamard Products The
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Diagonals and Hadamard Products The
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A Theorem of Furstenberg It follows
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As said, in characteristic zero, ne
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Page 174 and 175: A Beautiful Transcendence Argument
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Page 178 and 179: Breaking Up in Characteristic p The
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Page 210 and 211: The Lifting Theorem Looking careful
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Page 226 and 227: Whilst (i) and (ii) are reasonably
Page 228 and 229: References MICHEL DEKKING, MICHEL M
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Paperfolding, Automata, and Rational Functions - Diagonals and ...

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