arXiv:0712.0866 Abstract | arXiv Analytics

arXiv:0712.0866 [math.GT]Abstract References Reviews Resources

Alexander polynomials and hyperbolic volume of arborescent links

Published 2007-12-06Version 1

We realize a given (monic) Alexander polynomial by a (fibered) hyperbolic arborescent knot and link of any number of components, and by infinitely many such links of at least 4 components. As a consequence, a Mahler measure minimizing polynomial, if it exists, is realized as the Alexander polynomial of a fibered hyperbolic link of at least 2 components. For given polynomial, we give also an upper bound on the minimal hyperbolic volume of knots/links, and contrarily, construct knots of arbitrarily large volume, which are arborescent, or have given free genus at least 2.

Comments: 31 pages

Categories: math.GT

Subjects: 57M25, 57M12, 57M50

Keywords: alexander polynomial, arborescent links, minimal hyperbolic volume, mahler measure minimizing polynomial, components

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