On the Number of Cusps of Rational Cuspidal Plane Curves

Jens Piontkowski

doi:em/1204905880

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Home > Journals > Experiment. Math. > Volume 16 > Issue 2 > Article

2007 On the Number of Cusps of Rational Cuspidal Plane Curves

Jens Piontkowski

Experiment. Math. 16(2): 251-256 (2007).

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Abstract

A cuspidal curve is a curve whose singularities are all cusps, i.e., unibranched singularities. This article describes computations that lead to the following conjecture: A rational cuspidal plane curve of degree greater than or equal to six has at most three cusps. The curves with precisely three cusps occur in three series. Assuming the Flenner--Zaidenberg rigidity conjecture, the above conjecture is verified up to degree $20$