Structure and classification of torus theta-curves
Jack S. Calcut, Samantha E. Nieman
TL;DR
This paper classifies torus theta-curves embedded in the 3-sphere, providing explicit families, computing their constituent knots, and revealing structural properties that distinguish them from known examples.
Contribution
It offers a complete classification of torus theta-curves up to isotopy and homeomorphism, introducing explicit families and structural insights.
Findings
Constructed infinite families of prime torus theta-curves
Computed constituent knots of these theta-curves
Established a classification scheme for torus theta-curves
Abstract
We study theta-curves embedded in a standard torus in the 3-sphere. We show that each nontrivial torus knot together with an essential arc determines a prime theta-curve, yielding explicit infinite families of prime theta-curves. We compute their constituent knots and identify the structure governing these embeddings, which leads to a complete classification of torus theta-curves up to ambient isotopy and homeomorphism of the 3-sphere. In particular, Kinoshita's theta-curve does not lie on a standard torus.
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