On First Order Congruences of Lines in mathbb{P}⁴ with Generically Non-reduced Fundamental Surface
classification
🧮 math.AG
keywords
congruencesfundamentallinesnon-reducedordersurfacearticleclassification
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In this article we obtain a complete description of the congruences of lines in $\p^4$ of order one provided that the fundamental surface $F$ is non-reduced (and possibly reducible) at one of its generic points, and their classification under the hypothesis that $(F)_{\red}$ is smooth.
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