References
R. C. Cowsik andM. V. Nori, On the fibers of blowing up. J. Indian Math. Soc.40, 217–222 (1976).
D. Eisenbud, Homological algebra on a complete intersection, with an application to group representations. Trans. Amer. Math. Soc.260, 35–64 (1980).
T. Gullikson etO. NégÅrd, Un complexe résolvant pour certains idéaux déterminantiels. C. R. Acad. Sci.274, 16–18 (1972).
J. Herzog, A. Simis andW. Vasconcelos, Koszul homology and blowing up rings. Proc. Commutative Algebra Trento Conf., Lecture Notes Pure Appl. Math.84, 79–169, New York 1983.
J.Herzog, W.Vasconcelos and R.Villareal, Ideals with sliding depth. To appear in Nagoya Math. J.
C. Huneke, The theory ofd-sequences and powers of ideals. Advances in Math.46, 249–279 (1982).
C. Huneke, On the symmetric and Rees algebra of an ideal generated by ad-sequence. J. Algebra62, 268–275 (1980).
A. Micali, Sur les algèbras universelles. Ann. Institut Fourier,14, 33–88 (1964).
M.Ramras, Generic 2 by 2 matrices and periodic resolutions. Preprint.
E. Strickland, On the conormal bundle of the determinantal variety. J. Algebra75, 523–537 (1982).
E. Strickland, On the exactness of the Circular Complex, J. Algebra85, 382–389 (1983).
G. Valla, On the symmetric and Rees algebras of an ideal. Manuscripta Math.30, 239–255 (1980).
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Huneke, C. Determinantal ideals of linear type. Arch. Math 47, 324–329 (1986). https://doi.org/10.1007/BF01191358
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DOI: https://doi.org/10.1007/BF01191358