Intersection of ACM-curves in P3
Abstract
In this note we address the problem of determining the maximum number of points of intersection of two arithmetically Cohen-Macaulay curves in 3. We give a sharp upper bound for the maximum number of points of intersection of two irreducible arithmetically Cohen-Macaulay curves Ct and Ct-r in 3 defined by the maximal minors of a t × (t+1), resp. (t-r) × (t-r+1), matrix with linear entries, provided Ct-r has no linear series of degree d≤t-r+1 3 and dimension n≥ t-r.
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