Lyubeznik’s Resolution and Rooted Complexes
نویسنده
چکیده
We describe a new family of free resolutions for a monomial ideal I , generalizing Lyubeznik’s construction. These resolutions are cellular resolutions supported on the rooted complexes of the lcm-lattice of I . Our resolutions are minimal for the matroid ideal of a finite projective space.
منابع مشابه
Lyubeznik’s Invariants for Cohomologically Isolated Singularities
In this note I give a description of Lyubeznik’s local cohomology invariants for a certain natural class of local rings, namely the ones which have the same local cohomology vanishing as one expects from an isolated singularity. This strengthens our results of [BB04] while at the same time somewhat simplifying the proofs. Through examples I further point out the bad behavior of these invariants...
متن کاملComplexes of $C$-projective modules
Inspired by a recent work of Buchweitz and Flenner, we show that, for a semidualizing bimodule $C$, $C$--perfect complexes have the ability to detect when a ring is strongly regular.It is shown that there exists a class of modules which admit minimal resolutions of $C$--projective modules.
متن کاملOn a special class of Stanley-Reisner ideals
For an $n$-gon with vertices at points $1,2,cdots,n$, the Betti numbers of its suspension, the simplicial complex that involves two more vertices $n+1$ and $n+2$, is known. In this paper, with a constructive and simple proof, wegeneralize this result to find the minimal free resolution and Betti numbers of the $S$-module $S/I$ where $S=K[x_{1},cdots, x_{n}]$ and $I$ is the associated ideal to ...
متن کاملBroken circuit complexes: Factorizations and generalizations
Motivated by the question of when the characteristic polynomial of a matroid factorizes, we study join-factorizations of broken circuit complexes and rooted complexes (a more general class of complexes). Such factorizations of complexes induce factorizations not only of characteristic polynomial but also of the Orlik-Solomon algebra of the matroid. The broken circuit complex of a matroid factor...
متن کاملBroken Circuit Complexes: Factorizations and Generalizations
Motivated by the question of when the characteristic polynomial of a matroid factorizes, we study join-factorizations of broken circuit complexes and rooted complexes (a more general class of complexes). Such factorizations of complexes induce factorizations not only of the characteristic polynomial but also of the Orlik-Solomon algebra of the matroid. The broken circuit complex of a matroid fa...
متن کامل