Smooth mixed projective curves and a conjecture
Abstract
Let f( z, z) be a strongly mixed homogeneous polynomial of 3 variables z=(z1,z2,z3) of polar degree q with an isolated singularity at the origin. It defines a smooth Riemann surface C in the complex projective space P2. The fundamental group of the complement P2 C is cyclic group of order q if f is homogeneous polynomial without z. We propose a conjecture that this may be even true for mixed homogeneous polynomials by giving several supporting examples.
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