References
- Aramova , A. , Herzog , J. and Hibi , T. 1997 . Gotzman theorems for exterior algebras and combinatorics . J. Algebra , 191 : 174 – 211 .
- Eisenbud , D. 1995 . Commutative Algebra with a View Toward Algebraic Geometry , Volume 150 of Graduate Texts in Mathematics Springer Verlag .
- Eisenbud , D. , Peeva , I. and Sturmfels , B. 1998 . Non-commutative Gröbner bases for commutative algebras . Proc. Amer. Math. Soc. , 126 ( 3 ) : 687 – 691 .
- Green , M. L. 1996 . “ Generic initial ideals ” . In Proceedings of the Summer School on Commutative Algebra Vol. 2 , 16 – 85 . Barcelona : CRM .
- Green , M. and Stillman , M. 1998 . “ A tutorial on generic initial ideals ” . In Gröbner Bases and Applications (Linz, 1998) 90 – 108 . Cambridge : Cambridge Univ. Press .
- Maclagan , D. 1998/99 . Boolean term orders and the root system B n . Order , 15 ( 3 ) : 279 – 295 .
- Pardue, K. (1994). Nonstandard Borel-fixed Ideals. PhD thesis, Brandeis University
- Shearer , J. B. 1980 . A graded algebra with a nonrational Hilbert series . J. Algebra , 62 ( 1 ) : 228 – 231 .
- Ufnarovskiĭ , V. A. 1982 . Criterion for the growth of graphs and algebras given by words . Mat. Zametki , 31 ( 3 ) : 465 – 472, 476 . English translation: Math. Notes 31, (1981), no. 3–4, 238–241
- aIf 𝔞 contains the anti-commutator ideal, then in (g(𝔞)) is finitely generated, not only for a generic g ∈ GL(V), but for all g ∈ GL(V).