On singularities of determinantal hypersurfaces

Abstract

Given a closed subscheme Z in a smooth variety X, defined by the maximal minors of an s× r matrix of regular functions, with s≥ r, we consider the corresponding incidence correspondence W in Y=X× Pr-1, and relate the log canonical thresholds of (X,Z) and (Y,W). In particular, when r=s, we show that lct(X,Z)=1 if and only if lct(Y,W)=r. Moreover, in this case, we show that Z has rational singularities if and only if W has pure codimension r in Y and has rational singularities. As a consequence, we deduce that for a configuration hypersurface with a connected configuration matroid, the corresponding configuration incidence variety has rational singularities.