Detecting flatness over smooth bases

Abstract

Given an essentially finite type morphism of schemes f: X --> Y and a positive integer d, let fd: Xd --> Y denote the natural map from the d-fold fiber product, Xd, of X over Y and πi: Xd --> X the i'th canonical projection. When Y smooth over a field and F is a coherent sheaf on X, it is proved that F is flat over Y if (and only if) fd maps the associated points of the tensor product sheaf i=1d πi*(F) to generic points of Y, for some d greater than or equal to dim Y. The equivalent statement in commutative algebra is an analog---but not a consequence---of a classical criterion of Auslander and Lichtenbaum for the freeness of finitely generated modules over regular local rings.