Weierstrass Gap Sequence at Total Inflection Points of Nodal Plane Curves
Abstract
Let be a plane curve of degree d with δ ordinary nodes and no other singularities. If P is a smooth point on then the Weierstrass gap sequence at P is considered as that at the corresponding point on the normalization of . A smooth point P∈ is called a total inflection point if i( ,T;P)=d where T is the tangent line to at P. There are many possible Weierstrass gap sequences at total inflection points. Our main results are: Among them (1) There exists a pair (P, ) such that the gap sequence at P is the minimal (in the sense of weight). (2) There exists a pair (P, ) such that the gap sequence at P is the maximal (resp. up to 1 maximal). And we characterize these cases in the sense of location of nodes.
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