Equisingularity in families of double point curves

Abstract

In this paper, we provide a systematic comparison between the equisingularity of a 1-parameter unfolding F = (ft, t) of a finitely determined map germ f: (C2, 0) (C3, 0) and the equisingularity of its associated families of double point curves: D(F), F(D(F)), D2(F), and D2(F)/S2. We also construct explicit counterexamples to several natural questions concerning the equisingularity of these loci. As a key application, we introduce new families of complete intersection curves - referred to as Henry-type families - which are topologically trivial but fail to satisfy Whitney equisingularity conditions. Finally, we generalize classical double point curve formulas, originally established for map germs from (C2, 0) to (C3, 0), to the higher-dimensional setting of map germs from (Cn, 0) to (C2n-1, 0) for n ≥ 3, providing the associated curves with a convenient analytic structure.