n-blocks collections on Fano manifolds and sheaves with regularity -∞

Abstract

Let X be a smooth Fano manifold equipped with a `` nice '' n-blocks collection in the sense of cm2 and F a coherent sheaf on X. Assume that X is Fano and that all blocks are coherent sheaves. Here we prove that F has regularity -∞ in the sense of cm2 if Supp( F) is finite, the converse being true under mild assumptions. The corresponding result is also true when X has a geometric collection in the sense of cm1.