A formula for symbolic powers
Abstract
Let S be a Cohen-Macaulay ring which is local or standard graded over a field, and let I be an unmixed ideal that is also generically a complete intersection. Our goal in this paper is multi-fold. First, we give a multiplicity-based characterization of when an unmixed subideal J ⊂eq I(m) equals the m-th symbolic power I(m) of I. Second, we provide a saturation-type formula to compute I(m) and employ it to deduce a theoretical criterion for when I(m)=Im. Third, we establish an explicit linear bound on the exponent that makes the saturation formula effective, and use it to obtain lower bounds for the initial degree of I(m). Along the way, we prove a conjecture (in fact, a generalized version of it) due to Eisenbud and Mazur about annS(I(m)/Im), and we propose a conjecture connecting the symbolic defect of an ideal to Jacobian ideals.
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