[1] L. Avramov, Complete intersections and symmetric algebras, J. Alg.
73 (1981), 248-263.
[2] D. Buchsbaum and D. Eisenbud, What makes complex exact?, J.
Algebra 25 (1973), 84-139.
[3] D. Buchsbaum and D. Eisenbud, Algebra structures for finite free
resolutions and some structure theorems for ideals of codimension 3,
Amer. J. Math. 99 (1977), 447-485.
[4] S. Goto and S. Iai, Gorenstein graded rings associated to ideals,
J. Algebra 294(2) (2005), 373-407.
[5] S. Goto and Y. Nakamura, On the Gorensteinness in graded rings
associated to ideals of analytic deviation one, Contemp. Math. 159
(1994), 51-72.
[6] S. Goto and Y. Shimoda, On the Gorensteinness of Rees and form
rings of almost complete intersections, Nagoya Math. J. 92 (1983),
69-88.
[7] S. Hukaba and C. Huneke, Rees algebras of ideals having small
analytic deviation, Trans. Amer. Math. Soc. 339 (1993), 373-402.
[8] C. Huneke, On the symmetric and Rees of ideal Generated by
d-sequences, J. Alg. 62 (1980), 268-275.
[9] C. Huneke, The Koszul homology of an ideal, Adv. Math. 56 (1985),
295-318.
[10] A. Kustin, The minimal free resolutions of the Huneke-Ulrich
deviation two Gorenstein ideals, Proc. AMS J. Alg. 100 (1986),
265-304.
[11] S. Morey, Equations of blow up ideals of codimension two and
three, J. Pure and Appl. Alg. 109 (1996), 197-211.
[12] S. Morey and B. Ulrich, Rees algebras of ideals with low
codimension, Proc. AMS 124(12) (1996), 3653-3661.
[13] A. Simis, B. Ulrich and W. Vasconcelos, Cohen-Macaulay Rees
algebras and degrees of polynomial relations, Math. Ann. 301
(1995).
[14] B. Ulrich and W. Vasconcelos, The equations of Rees algebras of
ideals with linear presentation, Math. Z. 214 (1993), 79-92.
[15] W. Vasconcelos, Arithmetic of blowup algebras, London Math. LNS
195 (1994).