Florin Stan: Siegel-type limit points above the PSZ curve, 95-103

Let $\mathcal{F}$ be the set of minimal polynomials of totally real and positive algebraic integers. An element

of $\mathcal{F}$ can be written as $f=x^n-a_{n-1}x^{n-1}+\cdots+(-1)^n a_0$ , with $a_i \in \Z^{+}$ , for all $0 \le i \le n-1$ . A Siegel-type point is a limit point of the set

$\begin{displaymath}\mathcal{P} = \Bigg\{ \left( \frac{d}{n}, \left( \frac{a_{n-d... .../d} \right) \in \R^2: f \in \mathcal{F}, 1 \le d \le n \Bigg\} \end{displaymath}$

In this paper we investigate the location of these Siegel-type points and study some of their properties. We show that the points high enough in the strip are close to Siegel-type points.

Florin Stan: Siegel-type limit points above the PSZ curve, 95-103

Abstract: