Is it possible to say what surfaces occur as minimal models of surfaces of general type with $K_0(S)$ finitely generated and $H^q(S,\Omega^p_S)=0$, for $q\neq p$?
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According to Bloch's conjecture, all surfaces of general type $S$ with $H^0(S,\Omega^2_S)=0$ should have $CH(S)$ finitely generated, hence also $K_0(S)$. This is probably a very difficult conjecture, but it has been checked in a number of examples : see for instance this preprint and the references therein.
