Lie groups and their representations

Page de titre
Preface
Andrianov, A. N.: Zeta functions and the Siegel modular forms
Bernstein, I. N., Gelfand, I. M., Gelfand, S. I.: Differential operators on the base affine space and a study of g-modules
van Dijk, G.: Quasi-admissible representation of p-adic groups
Duflo, M.: Construction of primitive ideals in an enveloping algebra
Gelfand, I. M. and Kajdan, D. A.: Representations of the group GL(n K) where K is a local field
Gelfand, S. I.: Representations of the general linear group over a finite field
Goto, M., Wang, H.-Ch.: Deformations of non-discrete uniform subgroups of semisimple Lie groups
Harder, G.: On the cohomology of SL(2,D)
Kajdan, D. A.: On arithmetic varieties
Kirillov, A. A.: The method of orbits in representation theory
Kostant, B.: On the existence and irreducibility of certain series of representations
Labesse, J.-P.: L-indistinguishable representations and trace formula for SL(2)
Mackey, G. W.: On the analogy between semisimple Lie groups and certain related semi-direct product groups
Margulis, G. A.: On the action of unipotent groups in the space of lattices
Margulis, G. A.: Non-uniform lattices in semisimple algebraic groups
Mautner, F. J.: Spherical functions and Hecke operators
Mostow, G. D.: Discrete subgroups from a geometric viewpoint
Pjateckij-Sapiro, I. I.: On the Weil-Jacquet-Langlands theorem
Pjateckij-Sapiro, I. I.: Euler subgroups
Springer, T. A.: On the characters of certain finite groups
Springer, T. A.,: The zeta function of a cuspidal representation of a finite group GLn(k)
Tanaka, S.: On the Fourier transform of second degree characters
Verma, D.-N.: The rôle of affine Weyl groups in the representation theory of algebraic Chevalley groups and their Lie algebras
Zelobenko, D. P.: Elementary representations of a semisimple complex Lie group
Programme of the Summer School
Section A (= Advanced)
Section B(=Beginners)
List of contributors and foreign participants of the Summer School