Is a homotopy coherent nerve defined for algebraic model category that returns algebraic quasi-categories as Urs Schreiber [wrote about](https://golem.ph.utexas.edu/category/2010/06/algebraic_model_structures.html#c033531)? Or do we not know how to determine it / does it seem impossible? I did not quite understand: perhaps Mike Shulman pointed out some problem with finding a definition for this concept (in the same comments on the link)? Since at least September 2011 we have a monoidal algebraic model structure on the category of simplicial sets ([Emily Riehl - Monoidal algebraic model structures](https://emilyriehl.github.io/files/monoidal.pdf))