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RESEARCH INTERESTS Jonathan Weitsman's interests are in geometry in mathematical physics. Two areas he has worked on are applications of ideas from quantum field theory to problems in geometry and topology, and various topics in symplectic geometry. In the first area his work is focused on vector bundles on Riemann surfaces; in the second, he has been primarily interested in understanding group actions and reduced spaces. SELECTED PUBLICATIONS V. Guillemin, S. Sternberg, and J. Weitsman: The Ehrhart Function for Symbols. Surveys in Differential Geometry. Special memorial volume dedicated to S. S. Chern (2006) V. Guillemin, S. Sternberg, and J. Weitsman: Signature Quantization. Proc. Nat. Acad. Sci. USA 100, 12559-12560 (2003) Y. Karshon, S. Sternberg, and J. Weitsman: The Euler Maclaurin Formula for Simple Integral Polytopes. Proc. Nat. Acad. Sci. USA 100, 426-433 (2003) R. Bott, S. Tolman, and J. Weitsman: Subjectivity for Hamiltonian Loop Group Spaces. Invent. Math 155, 225-251 (2004) S. Tolman and J. Weitsman: The Cohomology Rings of Symplectic Quotients. Commun. Anal. Geom 11, 751-774 (2003) J. Weitsman: Geometry of the Intersection Ring of the Moduli Space of Flat Connections L. Jeffrey and J. Weitsman: Bohr-Sommerfeld Orbits in the Moduli Space of Flat Connections and the Verlinde Dimension Formula. Commun. Math. Phys 150, 593-630 (1992)
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