Geoffrey Mason

TitleProfessor Emeritus of Mathematics
DivisionPhysical & Biological Sciences
DepartmentPBSci-Mathematics Department
OfficeMcHenry Building Room #4153
Campus Mail StopMathematics Department
Mail1156 High Street
Santa Cruz, CA
Geoffrey Mason

Research Interests

Geoffrey Mason's present research interests lie in the broadly conceived area of physical mathematics called conformal field theory. The main focus at the moment is aimed at developing a theory of representations of vertex operator algebras, in particular in the presence of a group of symmetries. This endeavor involves close ties with many other areas of mathematics such as number theory (in particular the theory of elliptic modular forms and Siegal modular forms), Lie algebras, Hopf algebras and quantum groups, group theory and representations of groups, integrable models, Riemann surfaces, topological quantum, field theory, elliptic cohomology, etc.

Biography, Education and Training

B.Sc., University of London

Ms., Ph.D., University of Illinois, Chicago

Selected Publications

  • G. Mason and M. Truite: Chiral algebras and partition functions, Contemporary Math 442 (2007) 401-410.

  • G. Mason: Vector-valued modular forms and linear differential operators, Intnl J. Number Theory 3 No. 3 (2007) 377-390.

  • G. Mason and M. Truite: On Genus Two Riemann Surfaces Formed from Sewn Tori, Comm. Math. Phys 207 (2007) 587-634.

  • C. Goff, G. Mason, and S.-H. Ng: On the gauge-equivalence of twisted quantum doubles of elementary abelian and extra-special 2-groups, Journal of Algebra 312 No. 2 (2007) 849-875.

  • G. Mason: Reed-Muller Codes, the Fourth Cohomology of a Finite Group, and the b-invariant, Journal of Algebra 312 No. 1 (2007) 218-227.