On Huisman's conjectures about unramified real curves
Abstract
Let X ⊂ Pn be an unramified real curve with X(R) ≠ . If n ≥ 3 is odd, Huisman conjectures that X is an M-curve and that every branch of X(R) is a pseudo-line. If n ≥ 4 is even, he conjectures that X is a rational normal curve or a twisted form of a such. We disprove the first conjecture by giving a family of counterexamples. We remark that the second conjecture follows for generic curves of odd degree from the formula enumerating the number of complex inflection points.
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