Relativistic Quantum Mechanics

Two of the great revolutions of physics in the 20th century were relativity and quantum mechanics. Combining special relativity and quantum mechanics produced relativistic quantum mechanics or, as it is better known, quantum field theory. As soon as it was created, quantum field theory predicted the existence of antiparticles which were discovered shortly afterwards. Almost a century later, quantum field theory has become a mature field and is the framework within which the Standard Model of particle physics is built. The Standard Model has been extremely successful at predicting and explaining almost all experiments to date, with the most recent success being the spectacular confirmation of the Higgs boson predicted by the Standard Model. Nevertheless, there are many outstanding problems that are not yet accounted for by the Standard Model. Among those are the fine-tuning problem of the Higgs boson, the properties of dark matter, the explanation for dark energy, a detailed understanding of the hierarchy of fermion masses and the abundance of matter but not antimatter in the universe. On the other hand, there are also fundamental problems with quantum field theory itself. It is not able to successfully accommodate gravity at very small scales and therefore appears to be incomplete. Furthermore, new methods of calculating the probability of particle scattering appear to be leading us towards a more fundamental theory of relativistic quantum mechanics opening up new areas of research into fundamental physics.

My research deals with the exploration of these problems, both in the Standard Model and in the fundamental aspects of relativistic quantum mechanics itself. I use a combination of analytical and computational methods to explore these problems, sometimes emphasizing one and sometimes the other. Computational power continues to grow exponentially, following Moore's law, enabling ever more complex calculations. It is my belief that this will create one of the next revolutions in fundamental physics. On the other hand, a new theoretical understanding of a problem can often far surpass even the most powerful computational model. It is important to approach fundamental physics from both directions and find the most advantageous route at a particular time.

If you are an undergraduate or even a high school student who is interested in this field, please send me an email or drop by my office. I would be happy to discuss potential research projects with you. I am very interested in helping students develop successful careers in this field.