References
- Brookner, A., Corwin, D., Etingof, P., Sam, S. V. (2016). On Cohen–Macaulayness of Sn-invariant subspace arrangements. Int. Math. Res. Notices 2016(7):2104–2126. DOI: 10.1093/imrn/rnv200.
- Berkesch Zamaere, C., Griffeth, S., Sam, S. V. (2014). Jack polynomials as fractional quantum Hall states and the Betti numbers of the (k+1)-equals ideal. Comm. Math. Phys. 330:415–434.
- Björner, A., Peeva, I., Sidman, J. (2005). Subspace arrangements defined by products of linear forms. J. London Math. Soc. 71(02):273–288. DOI: 10.1112/S0024610705006356.
- de Loera, J. (1995). Gröbner bases and graph colorings. Beiträge Algebra Geom. 36:89–96.
- Haiman, M., Woo, A. (2010). Garnir modules, Springer fibers, and Ellingsrud-Strømme cells on the Hilbert Scheme of points, manuscript.
- Herzog, J., Hibi, T., Ohsugi, H. (2018). Binomial ideals. In Graduate Texts in Math, 279. Cham: Springer.
- Li, S.-Y. R., Li, W. C. W. (1981). Independence numbers of graphs and generators of ideals. Combinatorica 1(1):55–61. DOI: 10.1007/BF02579177.
- Lien, A. (2021). Symmetric ideals, master’s thesis UiT The Arctic University of Norway.
- Lovász, L. (1994). Stable sets and polynomials. Discrete Math. 124(1-3):137–153. DOI: 10.1016/0012-365X(92)00057-X.
- McDaniel, C., Watanabe, J. Principal radical systems, Lefschetz properties and perfection of Specht Ideals of two-rowed partitions. To appear in Nagoya. Math. J. arXiv:2103.00759.
- Moustrou, P., Riener, C., Verdure, H. (2021). Symmetric ideals, Specht polynomials and solutions to symmetric systems of equations. J. Symbolic Comput. 107:106–121. DOI: 10.1016/j.jsc.2021.02.002.
- Shibata, K., Yanagawa, K. (2021). Regularity of Cohen-Macaulay Specht ideals. J. Algebra 582:73–87. DOI: 10.1016/j.jalgebra.2021.04.022.
- Shibata, K., Yanagawa, K. Elementary construction of minimal free resolutions of the Specht ideals of shapes (n−2,2) and (d,d,1). To appear in J. Algebra Its Appl. arXiv:2010.06522.