The papers in this collection, all fully refereed, original
papers, reflect many aspects of recent significant advances
in homotopy theory and group cohomology.
From the Contents: A. Adem: On the geometry and cohomology
of finite simple groups.- D.J. Benson: Resolutions and
Poincar duality for finite groups.- C. Broto and S. Zarati:
On sub-A*-algebras of H*V.- M.J. Hopkins, N.J. Kuhn, D.C.
Ravenel: Morava K-theories of classifying spaces and
generalized characters for finite groups.- K. Ishiguro:
Classifying spaces of compact simple lie groups and p-tori.-
A.T. Lundell: Concise tables of James numbers and some
homotopyof classical Lie groups and associated homogeneous
spaces.- J.R. Martino: Anexample of a stable splitting: the
classifying space of the 4-dim unipotent group.- J.E.
McClure, L. Smith: On the homotopy uniqueness of BU(2) at
the prime 2.- G. Mislin: Cohomologically central elements
and fusion in groups.