On perturbations of singular complex analytic curves

Abstract

Suppose V is a singular complex analytic curve inside C2. We investigate when a singular or non-singular complex analytic curve W inside C2 with sufficiently small Hausdorff distance dH(V, W) from V must intersect V. We obtain a sufficient condition on W which when satisfied gives an affirmative answer to our question. More precisely, we show the intersection is non-empty for any such W that admits at most one non-normal crossing type discriminant point associated with some proper projection. As an application, we prove a special case of the higher-dimensional analog, and also a holomorphic multifunction analog of a result by Lyubich-Peters.