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Salem numbers, Pisot numbers, Mahler measure, and graphs.

McKee, James; Smyth, Chris — 2005

Experimental Mathematics

Families of Pisot numbers with negative trace

James McKee — 2000

Acta Arithmetica

Single polynomials that correspond to pairs of cyclotomic polynomials with interlacing zeros

James McKee; Chris Smyth — 2013

Open Mathematics

We give a complete classification of all pairs of cyclotomic polynomials whose zeros interlace on the unit circle, making explicit a result essentially contained in work of Beukers and Heckman. We show that each such pair corresponds to a single polynomial from a certain special class of integer polynomials, the 2-reciprocal discbionic polynomials. We also show that each such pair also corresponds (in four different ways) to a single Pisot polynomial from a certain restricted class, the cyclogenic...

Small exponent point groups on elliptic curves

Florian Luca; James McKee; Igor E. Shparlinski — 2006

Journal de Théorie des Nombres de Bordeaux

Let $E$ be an elliptic curve defined over $F_{q}$ , the finite field of $q$ elements. We show that for some constant $η > 0$ depending only on $q$ , there are infinitely many positive integers $n$ such that the exponent of $E (F_{q^{n}})$ , the group of $F_{q^{n}}$ -rational points on $E$ , is at most $q^{n} exp (- n^{η / log log n})$ . This is an analogue of a result of R. Schoof on the exponent of the group $E (F_{p})$ of $F_{p}$ -rational points, when a fixed elliptic curve $E$ is defined over $ℚ$ and the prime $p$ tends to infinity.

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Currently displaying 1 – 4 of 4

Salem numbers, Pisot numbers, Mahler measure, and graphs.

Families of Pisot numbers with negative trace

Single polynomials that correspond to pairs of cyclotomic polynomials with interlacing zeros

Small exponent point groups on elliptic curves