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Nonreciprocal algebraic numbers of small Mahler's measure

Tom 157 / 2013

Artūras Dubickas, Jonas Jankauskas Acta Arithmetica 157 (2013), 357-364 MSC: Primary 11R06; Secondary 11R09. DOI: 10.4064/aa157-4-3

Streszczenie

We prove that there exist at least $cd^5$ monic irreducible nonreciprocal polynomials with integer coefficients of degree at most $d$ whose Mahler measures are smaller than $2$, where $c$ is some absolute positive constant. These polynomials are constructed as nonreciprocal divisors of some Newman hexanomials $1+x^{r_1}+\cdots +x^{r_5}$, where the integers $1 \leq r_1< \cdots < r_5 \leq d$ satisfy some restrictions including $2r_j< r_{j+1}$ for $j=1,2,3,4$. This result improves the previous lower bound $cd^3$ and seems to be closer to the correct value of this function in $d$ than the best known upper bound which is exponential in $d$.

Autorzy

  • Artūras DubickasDepartment of Mathematics and Informatics
    Vilnius University
    Naugarduko 24
    Vilnius LT-03225, Lithuania
    e-mail
  • Jonas JankauskasDepartment of Mathematics and Informatics
    Vilnius University
    Naugarduko 24
    Vilnius LT-03225, Lithuania
    e-mail

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