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paper

Linear systems with multiple base points in P2

arXiv:math/0101109

Abstract

Given positive integers $m_1, m_2, ..., m_n$, and $n$ general points $p_i$ of ${\bf CP}^2$, bounds are given for the least degree $t$ among plane curves passing through each point $p_i$ with multiplicity at least $m_i$, and for the least $t$ such that the $n$ multiple points impose independent conditions on curves of degree $t$, often improving substantially what was previously known. As an application, the Hilbert function (resp., minimal free resolution) is determined for symbolic powers $I^{(m)}$ for the ideal $I$ defining $n$ general points of ${\bf CP}^2$ for infinitely many m for each square n (resp., for infinitely many m for each even square n). Four graphs are included showing other values of m and n for which results are given.

Final version, to appear in Advances in Geometry. Largely rewritten, now includes results determining Hilbert functions (resolutions, resp.) for infinitely many multiplicities for every square (even square, resp.) formerly included in math.AG/0104254, 18 pages PlainTeX, includes four figures