Real Equivariant Bordism and Stable Transversality Obstructions for $\ints/2$
by
Dev Sinha
Mathematics Department
Box 1917
Brown University
Providence, RI 02912
E-mail: dps@math.brown.edu
In this paper we compute homotopical equivariant bordism for the group
${\bf Z/2}$, namely $MO^{\bf Z/2}$, geometric equivariant bordism
$\Omega^{\bf Z/2}_*$, and their quotient as modules over geometric bordism.
This quotient is a module of stable transversality obstructions.
In doing these computations, we use the techniques of \cite{Si1}.
Because we are working in the real setting only with $\ints/2$,
these techniques simplify greatly.