On the topology of determinantal links

Abstract

We study the cohomology of the generic determinantal varieties Mm,ns = \ ∈ Cm× n : rank <s \, their polar multiplicities, their sections Dk Mm,ns by generic hyperplanes Dk of various dimension k, and the real and complex links of the spaces (Dk Mm,ns,0). Such complex links were shown to provide the basic building blocks in a bouquet decomposition for the (determinantal) smoothings of smoothable isolated determinantal singularities. The detailed vanishing topology of such singularities was still not fully understood beyond isolated complete intersections and a few further special cases. Our results now allow to compute all distinct Betti numbers of any determinantal smoothing.