A Jacobian module for disentanglements and applications to Mond's conjecture

Abstract

Given a germ of holomorphic map f from Cn to Cn+1, we define a module M(f) whose dimension over C is an upper bound for the A-codimension of f, with equality if f is weighted homogeneous. We also define a relative version My(F) of the module, for unfoldings F of f. The main result is that if (n,n+1) are nice dimensions, then the dimension of M(f) over C is an upper bound of the image Milnor number of f, with equality if and only if the relative module My(F) is Cohen-Macaulay for some stable unfolding F. In particular, if My(F) is Cohen-Macaulay, then we have Mond's conjecture for f. Furthermore, if f is quasi-homogeneous, then Mond's conjecture for f is equivalent to the fact that My(F) is Cohen-Macaulay. Finally, we observe that to prove Mond's conjecture, it suffices to prove it in a suitable family of examples.