| Abstract: |
The Galois group of the rational numbers is an important object in
number theory and is an active area of research. One way to understand this
complicated group is to study its representations. These representations can
be realized as cohomology of some spaces arising out of algebraic groups
defined over the rational numbers. In order for this machine to work, one
needs a self-dual cohomology theory on compactifications of these spaces. We
prove that such a cohomology theory exists for certain unitary Shimura
varieties. The talk will be a leisurely introduction to the circle of ideas.
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