学术文献库

To any homogeneous polynomial $h$ we naturally associate a variety $Ω_h$ which maps birationally onto the graph $Γ_h$ of the gradient map $\nabla h$ and which agrees with the space of complete quadrics when $h$ is the determinant of the generic symmetric matrix. We give a sufficient criterion for $Ω_h$ being smooth which applies for example when $h$ is an elementary symmetric polynomial. In this case $Ω_h$ is a smooth toric variety associated to a certain generalized permutohedron. We also give examples when $Ω_h$ is not smooth.