Thurston unit ball of a family of n-chained links and their fibered face
Abstract
We determine the Thurston unit ball of a family of n-chained link, denoted by C(n,p), where n is the number of link components and p is the number of twists. When p is strictly positive, we prove that the Thurston unit ball for C(n,p) is an n-dimensional cocube, for arbitrary n. Moreover, we clarify the condition for which C(n,p) is fibered and find at least one fibered face for any p. Finally we provide the Teichm\"uller polynomial for the face of Thurston unit ball of C(n, -2) with n≥ 3.
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