Identifier
etd-07052017-152842
Degree
Doctor of Philosophy (PhD)
Department
Mathematics
Document Type
Dissertation
Abstract
In this work, we present a brief survey of knot theory supported by contact 3-manifolds. We focus on transverse knots and explore different ways of studying transverse knots. We define a new family of transverse invariants, this is accomplished by considering $n$-fold cyclic branched covers branched along a transverse knot and we then extend the definition of the BRAID invariant $t$ defined in cite{BVV} to the lift of the transverse knot. We call the new invariant the lift of the BRAID invariant and denote it by $t_n$. We then go on to show that $t_n$ satisfies a comultiplication formula and use this result to prove a vanishing theorem for $t_n$. We also re-prove a previously known result regarding the $n$-fold branched covers branched along stabilized transverse knot. We use this result to prove another vanishing result for $t_n$.
Date
2017
Document Availability at the Time of Submission
Release the entire work immediately for access worldwide.
Recommended Citation
Ceniceros, Jose Hector, "On Braids, Branched Covers and Transverse Invariants" (2017). LSU Doctoral Dissertations. 4211.
https://repository.lsu.edu/gradschool_dissertations/4211
Committee Chair
Vela-Vick, David Shea
DOI
10.31390/gradschool_dissertations.4211