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Winding Number of $r$-modular sequences and Applications to the Singularity Content of a Fano Polygon

Published 30 Jan 2019 in math.CO and math.AG | (1901.10929v1)

Abstract: By generalising the notion of a unimodular sequence, we create an expression for the winding number of certain ordered sets of lattice points. Since the winding number of the vertices of a Fano polygon is necessarily one, we use this expression as a restriction to classify all Fano polygons without T-singularities and whose basket of residual singularities is of the form $\left{ \frac{1}{r}(1,s_{1}), \frac{1}{r}(1,s_{2}), \ldots, \frac{1}{r}(1,s_{k}) \right}$ for $k,r \in \mathbb{Z}{>0}$, and $1 \leq s{i} < r$ is coprime to $r$.

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