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arxiv: 1008.2733 · v1 · pith:7Y6A5PWYnew · submitted 2010-08-16 · 🧮 math.AG

Stability of syzygy bundles

classification 🧮 math.AG
keywords monomialssyzygybundledegreetherebundlescasechoice
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We show that given integers $N$, $d$ and $n$ such that ${N\ge2}$, ${(N,d,n)\ne(2,2,5)}$, and ${N+1\le n\le\tbinom{d+N}{N}}$, there is a family of $n$ monomials in $K[X_0,\ldots,X_N]$ of degree $d$ such that their syzygy bundle is stable. Case ${N\ge3}$ was obtained independently by Coand\v{a} with a different choice of families of monomials [Coa09]. For ${(N,d,n)=(2,2,5)}$, there are $5$ monomials of degree~$2$ in $K[X_0,X_1,X_2]$ such that their syzygy bundle is semistable.

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