Title of Paper: On Morava K-theories of an S-arithmetic group
Author: Marian F. Anton
AMS Classification numbers: 55N20,19F27,11F75
Address of Author: Department of Pure Mathematics,
University of Sheffield, Hicks Building, Sheffield S3 7RH, UK
Email address of Author: Marian.Anton@imar.ro
Text of Abstract: We completely describe the Morava K-theories
with respect to the prime p for the etale model of the classifying
space of the general linear group GL(m) over the ring Z[u,1/p]
when p is an odd regular prime and u a primitive p-th root of unity.
For p=3 and m=2 (and conjecturally in the stable range) these
K-theories are the same as those of the classifying space itself.