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Experimental Mathematics Volume 31, 2022 - Issue 3
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Original Articles

Searching for Hyperbolic Polynomials with Span Less than 4

Stefano CapparelliDepartment of Basic and Applied Sciences for Engineering, Sapienza University of Rome, Rome, ItalyCorrespondence[email protected]
,
Alberto Del FraDepartment of Basic and Applied Sciences for Engineering, Sapienza University of Rome, Rome, Italy
&
Andrea VietriDepartment of Basic and Applied Sciences for Engineering, Sapienza University of Rome, Rome, Italy
Pages 830-842 | Published online: 11 Jan 2020

References

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  • El Otmani, S., Maul, A., Rhin, G, Sac-Épée, J. M. (2013). Integer linear programming applied to determining monic hyperbolic irreducible polynomials with integer coefficients and span less than 4. J. Théor. Nombres Bordeaux. 25:71–78. DOI: 10.5802/jtnb.826
  • Flammang, V., Rhin, G, Wu, Q. (2011). The totally real algebraic integers with diameter less than 4. Mosc. J. Comb. Number Theory. 1:17–25.
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  • Robinson, R. (1962). Intervals containing infinitely many sets of conjugate algebraic integers. In: Gabor Szegö et al., eds. Studies in Mathematical Analysis and Related Topics: Essays in Honor of George Pólya. Stanford, CA: Stanford University Press, p. 305–315.
  • Robinson, R. (1964). Algebraic equations with Span less than 4. Math. Comput. 18:547–559. DOI: 10.2307/2002941
  • Robinson, R. (1964). Intervals containing infinitely many sets of conjugate algebraic units. Ann. Math. 80:411–428. DOI: 10.2307/1970656
  • Salem, R. (1944). A remarkable class of algebraic integers. Proof of a conjecture of Vijayaraghavan. Duke Math. J. 11:103–108. DOI: 10.1215/S0012-7094-44-01111-7
  • Salem, R. (1945). Power series with integral coefficients. Duke Math. J. 12:153–172. DOI: 10.1215/S0012-7094-45-01213-0
  • Salem, R. (1963). Algebraic Numbers and Fourier Analysis. Boston, MA: D.C. Heath and Co.
  • Schur, I. (1918). Über die Verteilung der Wurzeln bei gewissen algebraischen Gleichungen mit ganzzahligen Koeffizienten. Math. Z. 1:377–402. DOI: 10.1007/BF01465096
  • Smyth, C. (2015). Seventy years of Salem numbers: a survey. Bull. Lond. Math. Soc. 47(3):379–395. DOI: 10.1112/blms/bdv027
  • Walsh, J. L. (1922). On the location of the roots of certain types of polynomials. Trans. Am. Math. Soc. 24:163–180. DOI: 10.1090/S0002-9947-1922-1501220-0

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