On unexpected curves of type (d+k,d)
Abstract
We present a construction explaining the existence of (unexpected) curves of degree d+k, passing through a set Z of points on P2, and having a generic point P of multiplicity d. The construction is based on the syzygies of the k-th powers of Jacobian of the product of lines dual to the points of Z. We prove also a result characterizing the unexpectedness of the curves via splitting type of the bundle of these syzygies retricted to the line dual to P.
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