Divisibility sequences and powers of algebraic integers.

Silverman, Joseph H.

Displaying similar documents to “Divisibility sequences and powers of algebraic integers.”

Uniformly accurate quantile bounds via the truncated moment generating function: the symmetric case.

Klass, Michael J., Nowicki, Krzysztof (2007)

Electronic Journal of Probability [electronic only]

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Two-player knock 'em down.

Fill, James Allen, Wilson, David B. (2008)

Electronic Journal of Probability [electronic only]

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On some properties of two simultaneous polygonal sequences.

Su, Joseph C. (2007)

Journal of Integer Sequences [electronic only]

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On the approach to equilibrium for a polymer with adsorption and repulsion.

Caputo, Pietro, Martinelli, Fabio, Toninelli, Fabio Lucio (2008)

Electronic Journal of Probability [electronic only]

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The Rigid Body Dynamics: Classical and Algebro-geometric Integration

Borislav Gajić (2013)

Zbornik Radova

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The existence of limit cycle for perturbed bilinear systems

Hanen Damak, Mohamed Ali Hammami, Yeong-Jeu Sun (2012)

Kybernetika

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In this paper, the feedback control for a class of bilinear control systems with a small parameter is proposed to guarantee the existence of limit cycle. We use the perturbation method of seeking in approximate solution as a finite Taylor expansion of the exact solution. This perturbation method is to exploit the “smallness” of the perturbation parameter $ε$ to construct an approximate periodic solution. Furthermore, some simulation results are given to illustrate the existence of a limit...

De Rham-Witt cohomology and displays.

Langer, Andreas, Zink, Thomas (2007)

Documenta Mathematica

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Polygonal chain sequences in the space of compact sets.

Schlicker, Steven, Morales, Lisa, Schultheis, Daniel (2009)

Journal of Integer Sequences [electronic only]

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Diffeotopy functors of ind-algebras and local cyclic cohomology.

Puschnigg, Michael (2003)

Documenta Mathematica

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Some remarks on differentiable sequences and recursivity.

Fédou, Jean-Marc, Fici, Gabriele (2010)

Journal of Integer Sequences [electronic only]

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On the number of abelian groups of a given order (supplement)

Hong-Quan Liu (1993)

Acta Arithmetica

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1. Introduction. The aim of this paper is to supply a still better result for the problem considered in [2]. Let A(x) denote the number of distinct abelian groups (up to isomorphism) of orders not exceeding x. We shall prove Theorem 1. For any ε > 0, $A (x) = C ₁ x + C ₂ x^{1 / 2} + C ₃ x^{1 / 3} + O (x^{50 / 199 + ε})$ , where C₁, C₂ and C₃ are constants given on page 261 of [2]. Note that 50/199=0.25125..., thus improving our previous exponent 40/159=0.25157... obtained in [2]. To prove Theorem 1, we shall proceed along the line of approach presented...

Multiplication of free random variables and the $S$ -transform: the case of vanishing mean.

Rao, N.Raj, Speicher, Roland (2007)

Electronic Communications in Probability [electronic only]

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