Abstract:
We will introduce a certain class of sufficiently nice inverse
systems of DG categories, which we call (secondary) Mittag-Leffler systems.
The basic examples are given by the formal schemes and their noncommutative
generalization. It can be shown that for ML systems a certain non-standard
inverse limit (in the dualizable world) has a reasonable description, and
it generalizes the category of nuclear modules. Moreover, we expect that
for ML systems the K-theory commutes with inverse limits.