L2-Betti numbers of hypersurface complements

Abstract

In DJL07 it was shown that if is an affine hyperplane arrangement in n, then at most one of the L2--Betti numbers bi(2)(n ,) is non--zero. In this note we prove an analogous statement for complements of complex affine hyperurfaces in general position at infinity. Furthermore, we recast and extend to this higher-dimensional setting results of FLM,LM06 about L2--Betti numbers of plane curve complements.