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The Tor algebra of trimmings of Gorenstein ideals

Luigi Ferraro, Alexis Hardesty

Abstract

Let $(R,\mathfrak{m},\Bbbk)$ be a regular local ring of dimension 3. Let $I$ be a Gorenstein ideal of $R$ of grade 3. Buchsbaum and Eisenbud proved that there is a skew-symmetric matrix of odd size such that $I$ is generated by the sub-maximal pfaffians of this matrix. Let $J$ be the ideal obtained by multiplying some of the pfaffian generators of $I$ by $\mathfrak{m}$; we say that $J$ is a trimming of $I$. Building on a recent paper of Vandebogert, we construct an explicit free resolution of $R/J$ and compute a partial DG algebra structure on this resolution. We provide the full DG algebra structure in the appendix. We use the products on this resolution to study the Tor algebra of such trimmed ideals and we use the information obtained to prove that recent conjectures of Christensen, Veliche and Weyman on ideals of class $\mathbf{G}$ hold true in our context. Furthermore, we address the realizability question for ideals of class $\mathbf{G}$.

The Tor algebra of trimmings of Gorenstein ideals

Abstract

Let be a regular local ring of dimension 3. Let be a Gorenstein ideal of of grade 3. Buchsbaum and Eisenbud proved that there is a skew-symmetric matrix of odd size such that is generated by the sub-maximal pfaffians of this matrix. Let be the ideal obtained by multiplying some of the pfaffian generators of by ; we say that is a trimming of . Building on a recent paper of Vandebogert, we construct an explicit free resolution of and compute a partial DG algebra structure on this resolution. We provide the full DG algebra structure in the appendix. We use the products on this resolution to study the Tor algebra of such trimmed ideals and we use the information obtained to prove that recent conjectures of Christensen, Veliche and Weyman on ideals of class hold true in our context. Furthermore, we address the realizability question for ideals of class .
Paper Structure (6 sections, 16 theorems, 133 equations)

This paper contains 6 sections, 16 theorems, 133 equations.

Key Result

Lemma 2.7

Let $i,j,k$ be distinct elements of $\{1,\ldots,m\}$. Then

Theorems & Definitions (37)

  • Lemma 2.7
  • proof
  • Lemma 2.8
  • proof
  • Theorem 3.1
  • Example 3.2
  • proof : Proof of \ref{['thm:res']}
  • Remark 4.1
  • Theorem 4.2
  • Example 4.3
  • ...and 27 more