Diffeomorphisms, Isotopoies, and Braid Monodromy Factorizations of Plane Cuspidal Curves

Abstract

We prove that there is an infinite sequence of pairs of plane cuspidal curves Cm,1 and Cm,2, such that the pairs ( CP2, Cm,1) and ( CP2, Cm,2) are diffeomorphic, but Cm,1 and Cm,2 have non-equivalent braid monodromy factorizations. These curves give rise to the negative solutions of "Dif=Def" and "Dif=Iso" problems for plane irreducible cuspidal curves. In our examples, Cm,1 and Cm,2 are complex conjugated.

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