Divisibility sequences and powers of algebraic integers.

Silverman, Joseph H.

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

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On some properties of two simultaneous polygonal sequences.

Su, Joseph C. (2007)

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The existence of limit cycle for perturbed bilinear systems

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

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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...

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Langer, Andreas, Zink, Thomas (2007)

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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...