Since 2002 thanks to Giroux it is known that any 3-dimensional contact manifold $(M,\xi)$ can be obtained as 3-fold simple covering $f: M \to S^3$ branched along a link transverse to the standard contact structure of $S^3$ in such a way that induced contact structure by $f$ on $M$ is isotopic to $\xi$.
Recently, Cassals and Etnyre (2018) proved that it is possible to fix the link if we remove the conditions of simplicity and 3-folds. They also found a 5 component link with this property and which they called transverse universal. They also asked if there exists a universal transverse knot (one component link).
On this session, we will work on the above question.