How nice are free completions of categories?

Abstract

Every category K has a free completion P K under colimits and a free completion K under coproducts. A number of properties of K transfer to P K and K (e.g., completeness or cartesian closedness). We prove that P K is always a pretopos, but, for K large, seldom a topos. Moreover, for complete categories K we prove that P K is locally cartesian closed whenever K is additive or cartesian closed or dual to an extensive category. We also study the question whether P K is (co)wellpowered. The answer is affirmative for "set-like" categories. But for a number of categories K the answer turns out to be negative.