Curves in Pn of analytic spread at most n

Abstract

We study closed subschemes X in Pn of dimension one, locally defined at any point by at most n equations such that the analytic spread of Im is at most n, where I ⊂eq [x0, …, xn] is the defining ideal of X and m = (x0, …, xn). In this situation, we show that, under mild conditions, all the powers of Im have positive depth, hence the limit depth of Im is 1 unless I is a complete intersection. Moreover, the regularity of the Rees ring is at most one and the fiber cone is Cohen-Macaulay. This applies to every ideal defining a monomial curve in P3.

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