Computation of Minimal Finite Filtered Free Resolutions

Abstract We study bundles on projective spaces that have vanishing lower cohomologies using their short minimal free resolutions. We partition the moduli $\mathcal{M}$ according to the Hilbert function H and classify all possible Hilbert functions H of such bundles. For each H, we describe a stratification of $\mathcal{M}_H$ by quotients of rational varieties. We show that the closed strata form a graded lattice given by the Betti numbers.

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Generic free resolutions and root systems

Annales de l’institut Fourier ◽

10.5802/aif.3188 ◽

2018 ◽

Vol 68 (3) ◽

pp. 1241-1296

Author(s):

Jerzy Weyman

Keyword(s):

Root Systems ◽

Free Resolutions

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Algorithms for the Computation of Free Resolutions

Algorithmic Algebra and Number Theory ◽

10.1007/978-3-642-59932-3_15 ◽

1999 ◽

pp. 295-310

Author(s):

Thomas Siebert

Keyword(s):

Free Resolutions

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Stably free resolutions of lattices over finite groups

Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics ◽

10.1017/s1446788700032390 ◽

1990 ◽

Vol 49 (3) ◽

pp. 364-385

Author(s):

K. W. Gruenberg

Keyword(s):

Euler Characteristic ◽

Finite Groups ◽

Class Group ◽

Free Resolution ◽

Free Resolutions ◽

Minimal Free Resolution ◽

Residue Classes ◽

Projective Class

AbstractFor a ZG-lattice A, the nth partial free Euler characteristic εn(A) is defined as the infimum of all where F* varies over all free resolutions of A. It is shown that there exists a stably free resolution E* of A which realises εn(A) for all n≥0 and that the function n → εn(A) is ultimately polynomial no residue classes. The existence of E* is established with the help of new invariants σn(A) of A. These are elements in certain image groups of the projective class group of ZG. When ZG allows cancellation, E* is a minimal free resolution and is essentially unique. When A is periodic, E* is ultimately periodic of period a multiple of the projective period of A.

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