- ホーム
- > 洋書
- > 英文書
- > Science / Mathematics
Full Description
The world famous Gelfand Seminars began in Moscow in November 1943 and have continued uninterrupted to the present time, having recently moved their location to Rutgers University in New Brunswick, New Jersey. Parallel seminars have also been held in Moscow during July 1992, and at the IHES in Bures-sur-Yvette, France. The Seminars have always been known for their breadth of topics and diversity of styles - a true globalization of the art and science of mathematics. Many renowned mathematicians have presented new and interesting ideas at these seminars and been challenged and stimulated by the lively interaction with their colleagues and graduate students. Among the mathematicians represented in the 1990-1992 Seminars are: Jean-Luc Brylinski L. Corwin A. M. Gabrielov 1. M. Gelfand B. Goncharov D. Gorenstein Y.-Z. Huang M. M. Kapranov D. Kazhdan
Contents
Preface I.M. Gelfand The Degeneracy of Two Spectral Sequences Jean-Luc Brylinski Hopf Algebra Structures for the Heisenberg Algebra: I L. Corwin and I. M. Gelfand Avalanches, Sandpiles and Tutte Decompositions A. Gabrielov On the Dimension and Degree of the Projective Dual Variety: A q-Analog of the Katz-Kleiman Formula I. M. Gelfand and M. M. Kapranov Nonlocal Differentials I. M. Gelfand and M. M. Smirnov On the Local Geometry of a Bihamiltonian Structure 1. M. Gelfand and I. Zakharevich The classical polylogarithms, algebraic K-theory and CF(n) A. B. Goncharov A brief history of the sporadic simple groups Daniel Gorenstein Representations of the quantized function algebra's 2-categories and Zarnoladchikov tetrahedra equation D. Kazhdan and Y. Soibelman Formal (Non)-Commutative Symplectic Geometry Maxim Kontsevich Vertex operator algebras and operads Y-Zhi Huang and James Lepowsky Constructible functions, Lagrangian cycles and Computational Geometry Pierre Schapira Quantum groups and perverse sheaves. An example Vadim Schechtman Linearly Recursive Sequences, Witt Algebras and Quantum Groups E. J. Taft Complexes of Connected Graphs V. A. Vassiliev
