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A metric graph satisfying $w^1_4=1$ that cannot be lifted to a curve satisfying $dim (W^1_4)=1$

机译：满足$ w ^ 1_4 = 1 $的度量图无法提升为满足$ dim（W ^ 1_4）= 1 $的曲线

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摘要

For all integers $g geq 6$ we prove the existence of a metric graph $G$ with $w^1_4=1$ such that $G$ has Clifford index 2 and there is no tropical modification $G'$ of $G$ such that there exists a finite harmonic morphism of degree 2 from $G'$ to a metric graph of genus 1.Those examples show that dimension theorems on the space classifying special linear systems for curves do not all of them have immediate translation to the theory of divisors on metric graphs.

机译：对于所有整数$ g geq 6 $，我们证明存在带有$ w ^ 1_4 = 1 $的度量图$ G $，使得$ G $的Clifford指数为2，并且没有G的热带修改$ G'$ $使得存在从$ G'$到度量1的度量图的2度有限谐波同态性。这些例子表明，对曲线进行分类的特殊线性系统对空间进行分类的维定理并非都可以立即转化为度量图上的除数理论。

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Coppens Marc;
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年度 2016
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A metric graph satisfying $w^1_4=1$ that cannot be lifted to a curve satisfying $dim (W^1_4)=1$

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