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We define and discuss lax and weighted colimits of diagrams in -categories and show that the coCartesian fibration corresponding to a functor is given by its lax colimit. A key ingredient, of independent interest, is a simple characterization of the free Cartesian fibration on a functor of -categories. As an application of these results, we prove that 2-representable functors are preserved under exponentiation, and also that the total space of a presentable Cartesian fibration between is presentable, generalizing a theorem of Makkai and Paré to the -categories setting. Lastly, in an appendix, we observe that pseudofunctors between (2, 1) -categories give rise to functors between -categories via the Duskin nerve. setting and the Duskin nerve.
Haugseng et al. (Sun,) studied this question.