The official title of my master thesis (aka. Masterarbeit) in Bonn is On The Kuznetsov Components of Smooth Complex Cubic Threefolds. My master thesis has two main parts. One might notice that this title is different from the one listed in Daniel Huybrechts' website, that is because he only records the title of the first part. You should be able to find the full master thesis (which contains some errors, so please don't do that) in the Library of Mathematics in Bonn.

The first part of my thesis treats the group of FM-type autoequivalences on the Kuznetsov component of a cubic threefold. A revised version of the first part has been published as [2] where I totally determine the group. Using my result and Corollary 6.11 in [1], the group of all autoequivalences on the Kuznetsov component of a cubic threefold is well-understood.

The second part studies the Rouquier dimension of the Kuznetsov component of a cubic threefold. It shows that the Rouquier dimension ranges between one and two. I expect that it should be one, so that the Orlov conjecture holds for smooth cubic threefolds. However, I was not able to show it as a master student. I hope I could have time coming back to this question, figuring out the dimension, and get the second part published.