References
- [Castryck et al. XX] W. Castryck, F. Cools, J. Demeyer, and A. Lemmens. Computing graded Betti tables of toric surfaces. arXiv:1606.08181.
- [CHTC XX] CHTC. Center for High Throughput Computing. Information at http://chtc.cs.wisc.edu/.
- [Ein et al. 15] L. Ein, D. Erman, and R. Lazarsfeld. “Asymptotics of Random Betti Tables.” J. Reine Angew. Math. 702 (2015), 55–75.
- [Ein et al. 16] L. Ein, D. Erman, and R. Lazarsfeld. “A Quick Proof of Nonvanishing for Asymptotic Syzygies.” Algebr. Geom. 3(2) (2016), (211–222).
- [Ein and Lazarsfeld 93] L. Ein and R. Lazarsfeld. “Syzygies and Koszul Cohomology of Smooth Projective Varieties of Arbitrary Dimension.” Invent. Math. 111(1) (1993), (51–67).
- [Ein and Lazarsfeld 12] L. Ein and R. Lazarsfeld. “Asymptotic Syzygies of Algebraic Varieties.” Invent. Math. 190(3) (2012), (603–646).
- [Eisenbud et al. 02] D. Eisenbud, D. R. Grayson, M. Stillman, and B. Sturmfels (eds.), “Computations in Algebraic Geometry with Macaulay 2.” in Algorithms and Computation in Mathematics, edited by David Eisenbud, Daniel R. Grayson, Michael Stillman, Bernd Sturmfels. Vol. 8. Berlin: Springer-Verlag. (2002), pp. xvi+329.
- [Eisenbud and Schreyer 09] D. Eisenbud and F.-O. Schreyer. “Betti Numbers of Graded Modules and Cohomology of Vector Bundles.” J. Amer. Math. Soc. 22(3) (2009), (859–888).
- [Erman 15] D. Erman. “The Betti Table of a High-Degree Curve is Asymptotically Pure.” Recent advances in algebraic geometry, London Math. Soc. Lecture Note Ser. Vol. 417. Cambridge: Cambridge Univ. Press. (2015) pp. 200–206.
- [Fløystad 12] G. Fløystad. Boij-Söderberg theory: introduction and survey, Progress in commutative algebra 1, de Gruyter, Berlin (2012), pp. 1–54.
- [Fulton and Harris 91] W. Fulton and J. Harris. Representation theory. Graduate Texts in Mathematics. Vol. 129. A first course; Readings in Mathematics. New York: Springer-Verlag. (1991). pp. xvi+551.
- [Gill et al. 87] P. E. Gill, W. Murray, M. A. Saunders, and M. H. Wright. “Maintaining LU Factors of a General Sparse Matrix.” Linear Algebra Appl. 88/89 (1987), 239–270.
- [Golub and Van Loan 96] G. H. Golub and C. F. Van Loan. “Matrix Computations. in Johns Hopkins Studies in the Mathematical Sciences. edition 3. Baltimore, MD: Johns Hopkins University Press. (1996).
- [Green 84a] M. L. Green. “Koszul Cohomology and the Geometry of Projective Varieties.” J. Differential Geom. 19(1) (1984a), 125–171.
- [Green 84b] M. L. Green. “Koszul Cohomology and the Geometry of Projective Varieties. II.” J. Differential Geom. 20(1) (1984), 279–289.
- [Greco and Martino 16] O. Greco and I. Martino. “Syzygies of the Veronese Modules.” Comm. Algebra 44(9) (2016), 3890–3906.
- [Gu and Eisenstat 96] M. Gu and S. C. Eisenstat. “Efficient Algorithms for Computing a Strong Rank-Revealing QR Factorization.” SIAM J. Sci. Comput. 17(4) (1996), 848–869.
- [Grayson and Stillman XX] D. R. Grayson and M. E. Stillman. Macaulay 2, a software system for research in algebraic geometry. Available at http://www.math.uiuc.edu/Macaulay2/.
- [HTCondor Team XX] HTCondor Team, Computer Sciences Department, University of Wisconsin-Madison. HTCondor, open source distributed computing software. Information at https://research.cs.wisc.edu/htcondor.
- [MATLAB XX] Massachusetts MATLAB. version 7.10.0 (R2010a). The MathWorks Inc. (2010) Natick.
- [Open Science Grid XX] Open Science Grid. Information at https://www.opensciencegrid.org/.
- [Sam 14] S. V. Sam. “Derived Supersymmetries of Determinantal Varieties.” J. Commut. Algebra 6(2) (2014), 261–286.
- [Thain 05] D. Thain, T. Tannenbaum, and M. Livny. “Distributed Computing in practice: The Condor experience.” Concurrency - Practice and Experience 17(2-4) (2005), 323–356.