ON THE DIMENSION OF SPACES OF ALGEBRAIC CURVES PASSING THROUGH $ n $-INDEPENDENT NODES

H. Hakopian, H. Kloyan
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引用次数: 4

Abstract

Let the set of nodes $ \LARGE{x} $ in the plain be $ n $-independent, i.e., each node has a fundamental polynomial of degree $ n $. Suppose also that $ \vert \LARGE{x} \normalsize \vert \mathclose{=} (n \mathclose{+} 1) \mathclose{+} n \mathclose{+} \cdots \mathclose{+} (n \mathclose{-} k \mathclose{+} 4) \mathclose{+} 2 $ and $ 3 \mathclose{\leq} k \mathclose{\leq} n \mathclose{-} 1 $. We prove that there can be at most 4 linearly independent curves of degree less than or equal to $ k $ passing through all the nodes of $ \LARGE{x} $. We provide a characterization of the case when there are exactly 4 such curves. Namely, we prove that then the set $ \LARGE{x} $ has a very special construction: all its nodes but two belong to a (maximal) curve of degree $ k \mathclose{-} 2 $. At the end, an important application to the Gasca-Maeztu conjecture is provided.
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通过n独立节点的代数曲线空间的维数
设平面中的节点集$ \LARGE{x} $是$ n $独立的,即每个节点有一个次为$ n $的基本多项式。再假设$ \vert \LARGE{x} \normalsize \vert \mathclose{=} (n \mathclose{+} 1) \mathclose{+} n \mathclose{+} \cdots \mathclose{+} (n \mathclose{-} k \mathclose{+} 4) \mathclose{+} 2 $和$ 3 \mathclose{\leq} k \mathclose{\leq} n \mathclose{-} 1 $。我们证明了最多可以有4条度小于或等于$ k $的线性无关曲线通过$ \LARGE{x} $的所有节点。我们提供了恰好有4条这样的曲线的情况的特征。也就是说,我们证明了集合$ \LARGE{x} $有一个非常特殊的结构:除了两个节点外,它的所有节点都属于一次为$ k \mathclose{-} 2 $的(最大)曲线。最后给出了Gasca-Maeztu猜想的一个重要应用。
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