Nafaa Chbili scite author profile

Abstract. We construct an infinite family of quasi-alternating links from a given quasialternating link by replacing a crossing by a product of rational tangles each of which extends that crossing. Consequently, we determine an infinite family of quasi-alternating Montesinos links. This family contains all the classes of quasi-alternating Montesinos links that have been detected by Widmar in [W]. We conjecture that this family contains all quasi-alternating Montesinos links up to mirror image that are not alternating and this will characterize all quasi-alternating Montesinos links.

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The skein polynomial of freely periodic knots

Chbili

2002

Topology and its Applications

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A new obstruction of quasialternating links

Qazaqzeh¹,

Chbili²

2015

Algebr. Geom. Topol.

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We prove that the degree of the Q-polynomial of any quasialternating link is less than its determinant. Therefore, we obtain a new and simple obstruction criterion for the link to be quasialternating. As an application, we identify some knots of 12 crossings or less and some links of 9 crossings or less that are not quasialternating. Our obstruction criterion applies also to show that there are only finitely many Kanenobu knots that are quasialternating. Moreover, we identify an infinite family of Montesinos links that are not quasialternating.

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Skein algebras of the solid torus and symmetric spatial graphs

Chbili

2006

Fund. Math.

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Nafaa Chbili

The quantum SU(3) invariant of links and Murasugi's congruence

Characterization of quasi-alternating Montesinos links

The skein polynomial of freely periodic knots

A new obstruction of quasialternating links

Skein algebras of the solid torus and symmetric spatial graphs

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