#### Volume 6, issue 4 (2006)

 1 D W Boyd, Kronecker's theorem and Lehmer's problem for polynomials in several variables, J. Number Theory 13 (1981) 116 MR602452 2 A Champanerkar, I Kofman, On the Mahler measure of Jones polynomials under twisting, Algebr. Geom. Topol. 5 (2005) 1 MR2135542 3 A Champanerkar, I Kofman, E Patterson, The next simplest hyperbolic knots, J. Knot Theory Ramifications 13 (2004) 965 MR2101238 4 T Kanenobu, Examples on polynomial invariants of knots and links, Math. Ann. 275 (1986) 555 MR859330 5 T Kanenobu, Infinitely many knots with the same polynomial invariant, Proc. Amer. Math. Soc. 97 (1986) 158 MR831406 6 M Lackenby, The volume of hyperbolic alternating link complements, Proc. London Math. Soc. $(3)$ 88 (2004) 204 MR2018964 7 W M Lawton, A problem of Boyd concerning geometric means of polynomials, J. Number Theory 16 (1983) 356 MR707608 8 W B R Lickorish, An introduction to knot theory, Graduate Texts in Mathematics 175, Springer (1997) MR1472978 9 A Schinzel, The Mahler measure of polynomials, from: "Number theory and its applications (Ankara, 1996)", Lecture Notes in Pure and Appl. Math. 204, Dekker (1999) 171 MR1661667 10 D Silver, A Stoimenow, S Williams, Euclidean Mahler measure and twisted links, Algebr. Geom. Topol. 6 (2005) 581 11 L Watson, Any tangle extends to non-mutant knots with the same Jones polynomial, to appear in J. Knot Theory Ramifications