My thesis is here, but it's not really the kind of thing that you want to read, it's rather wordy. It will perhaps one day appear as a few shorter papers.

A short note about an elementary construction of p-adic families of eigenforms (in a weak sense) for definite quaternion algebras is here. An even shorter note, vaguely about constructing families for classical eigenforms is here. These might turn into parts of a paper I'm currently writing, but currently I'm not too happy with them, they give simple proofs of weak versions of theorems that are already known about families of modular forms. I'm currently trying to find an appropriate place to lay these proofs to rest.

I found myself continually being asked what the local Langlands conjectures were, for some reason, once, so I wrote some notes on GL_2, inspired by a course that Richard Taylor once gave in Caltech in 1992. Stuff about local Langlands is here (note: these notes were written in 1998 before the proof of the Local Langlands conjectures for GL(n) was announced) and stuff about the Jacquet-Langlands correspondence for definite quaternion algebras is here. All this stuff has never been submitted anywhere and so has never been refereed. Read at your own risk :-) and comments welcome.