CODIMENSION TWO DETERMINANTAL VARIETIES WITH ISOLATED SINGULARITIES

We study codimension two determinantal varieties with isolated singularities. These singularities admit a unique smoothing, thus we can define their Milnor number as the middle Betti number of their generic fiber. For surfaces in C-4, we obtain a Le-Greuel formula expressing the Milnor number of the surface in terms of the second polar multiplicity and the Milnor number of a generic section. We also relate the Milnor number with Ebeling and Gusein-Zade index of the 1-form given by the differential of a generic linear projection defined on the surface. To illustrate the results, in the last section we compute the Milnor number of some normal forms from Fruhbis-Krtiger and Neumer {[}7] list of simple determinantal surface singularities. (AU)