Theoretical particle physics has advanced its frontiers enormously in recent
years. The success of the Weinberg-Salam model of electroweak interactions,
culminating in the discovery of the W and Zo, has led to
efforts to find a unified theory including quantum chromodynamics and perhaps
general relativity as well. A theory of all interactions and particles usually
has far-reaching implications, for instance predicting proton decay, and
affecting the development of the universe in the first few moments after the
big bang. Thus particle physics now relates to problems in cosmology, such as
galaxy formation and the observed predominance of matter over antimatter. The
most ambitious of these unified theories - superstrings - is being intensively
Professor Tom Banks
Since 1996 I have been primarily working on the nonperturbative formulation of superstring theory invented by Steve Shenker, myself and our collaborators. This defines string theory as the limit of quantum mechanical systems whose basic variables are matrices, and incorporates many of the results of string duality. I retain my interests in supersymmetric field theory, supersymmetry phenomenology, and cosmology.
Professor John Bronzan
My current interest is in non-pertubative Hamiltonian QCD and related field theories.
Professor Diuliu-Emanuel Diaconescu
Professor Michael Douglas
My research is in string theory as a theory of fundamental interactions and quantum gravity, and in non-perturbative methods in field theory. I am currently studying large N field theories, to develop ideas for the non-perturbative definition of string theories, and for possible application to QCD physics. I also work on supersymmetric gauge theory and on conformal field theory, and I maintain an interest in computational techniques for theoretical physics.
Professor Daniel Friedan
I am interested in string theory as a fundamental description of elementary particles and forces and in quantum field theories and string theories as effective descriptions of elementary particles and critical phenomena. Recently, I have been trying to formulate non-perturbative string theory so as to make possible low-energy predictions and comparison with experiment.
Professor Claud Lovelace
I am working on string field theory. Long ago, when I discovered the
critical dimension (Phys.Lett.B34,500(1971)), I showed that strings can lead to
a composite graviton.
Professor Sergei Lukyanov
My research activities are in the areas of quantum field theory, mathematical physics and statistical mechanics. Currently I am mostly interested in exactly soluble low dimensional models.
Professor Gregory Moore
I work on mathematical physics related to quantum field theory and string theory. Specific topics include:
· Rational conformal field theory, together with applications to the quantum Hall effect,
· Matrix models of string theories, especially in low dimensions.
· Quantization of Chern-Simons theories and self-dual fields.
· The mathematics of D-branes, including relations to (differential) K-theory and the application of topology to supergravity.
· The use of modular forms and automorphic functions in deriving low energy supergravity actions and in accounting for black hole entropy in terms of statistical counting of microstates.
· Mathematical applications of physical ideas, such as: Applications of Seiberg-Witten theory to the theory of 4-manifolds; applications of string theory to number theory.
Professor Herbert Neuberger
My area of specialization is Field Theory and I am mostly interested in its non-perturbative aspects.
Professor Joel Shapiro
My work has been centered primarily on string theory, especially the understanding of closed strings as they appear in an open string theory, and of the Green-Schwarz string in curved superspace backgrounds, and the connection of the necessary constraints on such backgrounds with supergravity.
Professor Scott Thomas
Professor Alexander Zamolodchikov
I am working on quantum field theory in relation to both high-energy physics and statistical physics. More specifically, I am looking for exact solutions to model quantum field theories, and trying to elaborate mathematical structures of such solutions as well as applications to physics of criticality, strings and gravity. Presently I am interested in various aspects of the fascinating interplay between integrable field theories, conformal field theories, and string theory.
Revised September, 2006