D-modules on Infinite Dimensional Varieties

1.2. The basic feature that we struggle against is that there are two types of infinite dimensionality at play: pro-infinite dimensionality and ind-infinite dimensionality. That is, we could have an infinite dimensional variety S that is the union S “ YiSi “ colimiSi of finite dimensional varieties, or T that is the projective limit T “ limj Tj of finite dimensional varieties, e.g., a scheme of infinite type. Any reasonable theory of D-modules will produce produce some kinds of de Rham homology and cohomology groups. We postulate as a basic principle that these groups should take values in discrete vector spaces, that is, we wish to avoid projective limits. Then, in the ind-infinite dimensional case, the natural theory is the homology of S: