The arithmetical rank of k-complete ideals
Abstract
We introduce the notions of algebraic and arithmetic derivation. As an application, we use the combinatorial decomposition of an ideal to provide a constructive method to find the algebraic invariants, as the arithmetical rank, for a family of squarefree monomial ideals, the $k$--complete ideals $I_k^n,$ also known as squarefree Veronese ideals of degree $k$.
Keywords
arithmetical rank, Lyubeznik resolution, monomial ideal, projective dimension
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