Topologically equisingular deformations of homogeneous hypersurfaces with line singularities are equimultiple

Abstract

We prove that if \ft\ is a family of line singularities with constant L\e numbers and such that f0 is a homogeneous polynomial, then \ft\ is equimultiple. This extends to line singularities a well known theorem of A. M. Gabri\`elov and A. G. Kusnirenko concerning isolated singularities. As an application, we show that if \ft\ is a topologically V-equisingular family of line singularities, with f0 homogeneous, then \ft\ is equimultiple. This provides a new partial positive answer to the famous Zariski multiplicity conjecture for a special class of non-isolated hypersurface singularities.