Twisted alexander polynomials and character varieties of 2-bridge knot groups

Taehee Kim; Takayuki Morifuji

doi:10.1142/S0129167X11007653

Twisted alexander polynomials and character varieties of 2-bridge knot groups

Taehee Kim, Takayuki Morifuji

Faculty of Economics

Research output: Contribution to journal › Review article › peer-review

10 Citations (Scopus)

Abstract

We study the twisted Alexander polynomial from the viewpoint of the SL(2,&Cmathbb;)-character variety of nonabelian representations of a knot group. It is known that if a knot is fibered, then the twisted Alexander polynomials associated with nonabelian SL(2,&Cmathbb;)-representations are all monic. In this paper, we show that for a 2-bridge knot there exists a curve component in the SL(2,&Cmathbb;)-character variety such that if the knot is not fibered then there are only finitely many characters in the component for which the associated twisted Alexander polynomials are monic. We also show that for a 2-bridge knot of genus g, in the above curve component for all but finitely many characters the associated twisted Alexander polynomials have degree 4g - 2.

Original language	English
Article number	1250022
Journal	International Journal of Mathematics
Volume	23
Issue number	6
DOIs	https://doi.org/10.1142/S0129167X11007653
Publication status	Published - 2012 Jun

Keywords

2-bridge knot
Twisted Alexander polynomial
character variety

ASJC Scopus subject areas

Mathematics(all)

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10.1142/S0129167X11007653

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title = "Twisted alexander polynomials and character varieties of 2-bridge knot groups",

abstract = "We study the twisted Alexander polynomial from the viewpoint of the SL(2,&Cmathbb;)-character variety of nonabelian representations of a knot group. It is known that if a knot is fibered, then the twisted Alexander polynomials associated with nonabelian SL(2,&Cmathbb;)-representations are all monic. In this paper, we show that for a 2-bridge knot there exists a curve component in the SL(2,&Cmathbb;)-character variety such that if the knot is not fibered then there are only finitely many characters in the component for which the associated twisted Alexander polynomials are monic. We also show that for a 2-bridge knot of genus g, in the above curve component for all but finitely many characters the associated twisted Alexander polynomials have degree 4g - 2.",

keywords = "2-bridge knot, Twisted Alexander polynomial, character variety",

author = "Taehee Kim and Takayuki Morifuji",

note = "Funding Information: would like to thank Stefan Friedl for helpful comments and correcting the proof of Theorem 4.3. The first author was supported by the National Research Foundation of Korea (NRF) grant funded by the Korea government (MEST) (Nos. 2009-0068877 and 2009-0086441). The second author was supported in part by the Grant-in-Aid for Scientific Research (No. 20740030), the Ministry of Education, Culture, Sports, Science and Technology, Japan.",

year = "2012",

month = jun,

doi = "10.1142/S0129167X11007653",

language = "English",

volume = "23",

journal = "International Journal of Mathematics",

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T1 - Twisted alexander polynomials and character varieties of 2-bridge knot groups

AU - Kim, Taehee

AU - Morifuji, Takayuki

N1 - Funding Information: would like to thank Stefan Friedl for helpful comments and correcting the proof of Theorem 4.3. The first author was supported by the National Research Foundation of Korea (NRF) grant funded by the Korea government (MEST) (Nos. 2009-0068877 and 2009-0086441). The second author was supported in part by the Grant-in-Aid for Scientific Research (No. 20740030), the Ministry of Education, Culture, Sports, Science and Technology, Japan.

PY - 2012/6

Y1 - 2012/6

N2 - We study the twisted Alexander polynomial from the viewpoint of the SL(2,&Cmathbb;)-character variety of nonabelian representations of a knot group. It is known that if a knot is fibered, then the twisted Alexander polynomials associated with nonabelian SL(2,&Cmathbb;)-representations are all monic. In this paper, we show that for a 2-bridge knot there exists a curve component in the SL(2,&Cmathbb;)-character variety such that if the knot is not fibered then there are only finitely many characters in the component for which the associated twisted Alexander polynomials are monic. We also show that for a 2-bridge knot of genus g, in the above curve component for all but finitely many characters the associated twisted Alexander polynomials have degree 4g - 2.

AB - We study the twisted Alexander polynomial from the viewpoint of the SL(2,&Cmathbb;)-character variety of nonabelian representations of a knot group. It is known that if a knot is fibered, then the twisted Alexander polynomials associated with nonabelian SL(2,&Cmathbb;)-representations are all monic. In this paper, we show that for a 2-bridge knot there exists a curve component in the SL(2,&Cmathbb;)-character variety such that if the knot is not fibered then there are only finitely many characters in the component for which the associated twisted Alexander polynomials are monic. We also show that for a 2-bridge knot of genus g, in the above curve component for all but finitely many characters the associated twisted Alexander polynomials have degree 4g - 2.

KW - 2-bridge knot

KW - Twisted Alexander polynomial

KW - character variety

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U2 - 10.1142/S0129167X11007653

DO - 10.1142/S0129167X11007653

M3 - Review article

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SN - 0129-167X

VL - 23

JO - International Journal of Mathematics

JF - International Journal of Mathematics

IS - 6

M1 - 1250022

ER -

Twisted alexander polynomials and character varieties of 2-bridge knot groups

Abstract

Keywords

ASJC Scopus subject areas

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