References
- Boyd, D. (1981). Speculations concerning the range of Mahler’s measure. Canad. Math. Bull. 24: 453–469. doi:10.4153/CMB-1981-069-5
- Boyd, D., Mossinghoff, M. (2005). Small limit points of Mahler’s measure. Exper. Math. 14: 403–414. doi:10.1080/10586458.2005.10128936
- Breusch, R. (1951). On the distribution of the roots of a polynomial with integral coefficients. Proc. Amer. Math. Soc. 2: 939–941. doi:10.1090/S0002-9939-1951-0045246-9
- Coyston, J. (in preparation). Mahler measures and digraphs. Ph.D. thesis, Royal Holloway, University of London.
- Lawton, W. (1983). A problem of Boyd concerning geometric means of polynomials. J. Number Theory 16: 356–362. doi:10.1016/0022-314X(83)90063-X
- McKee, J., Smyth, C. (2005). Salem numbers, Pisot numbers, Mahler measure, and graphs. Exp. Math. 14(2): 211–229.
- McKee, J., Smyth, C. (2007). Integer symmetric matrices having all their eigenvalues in the interval [−2,2]. J. Algebra 317: 260–290.
- McKee, J., Smyth, C. (2012). Integer symmetric matrices of small spectral radius and small Mahler measure. Int. Math. Res. Not. 2012(1): 102–136.
- McKee, J., Smyth, C. (2020). Symmetrizable integer matrices having all their eigenvalues in the interval [−2,2]. Algebraic Comb. 3: 775–789.
- Mossinghoff, M. http://www.cecm.sfu.ca/∼mjm/Lehmer/lists/index.html.
- Mossinghoff, M. (1998). Polynomials with small mahler measure. Math. Comp. 67(224): 1697–1705.
- El Otmani, S., Maul, A., Rhin, G., and Sac Épée, J-M. (2017). Finding new small degree polynomials with small Mahler measure by genetic algorithms. Rocky Mountain J. Math. 47(8):2619–2626.
- Rowlinson, P. (1987). A deletion-contraction algorithm for the chracteristic polynomial of a multigraph. Proc. Royal Soc. Edinburgh 105A: 153–160. doi:10.1017/S0308210500021983
- Sac-Épée, J.-M. http://www.iecl.univ-lorraine.fr/∼Jean-Marc.Sac-Epee/SMM3.txt.
- Smyth, C. J. (1971). On the product of the conjugates outside the unit circle of an algebraic integer. Bull. London Math. Soc. 3: 169–175. doi:10.1112/blms/3.2.169
- The PARI-Group, Univ. Bordeaux, PARI/GP version 2.11.2, 2019. Available at: http://pari/math.u-bordeaux.fr/.
- Titchmarsh, E. C. (1939). The Theory of Functions. Oxford: Oxford University Press.