The configuration space of gauge theory on open manifolds of bounded geometry
Tom 39 / 1997
Banach Center Publications 39 (1997), 269-286
DOI: 10.4064/-39-1-269-286
Streszczenie
We define suitable Sobolev topologies on the space ${\cal C}_P(B_k,f)$ of connections of bounded geometry and finite Yang-Mills action and the gauge group and show that the corresponding configuration space is a stratified space. The underlying open manifold is assumed to have bounded geometry.