1 |
V. Buchstaber and T. Panov, Torus actions and their applications in topology and combinatorics, University Lecture Series, Vol. 24, Amer. Math. Soc., Providence, Rhode Island, 2002.
|
2 |
V. Buchstaber and T. Panov, Toric topology, Math. Surveys and Monograph 204, Amer. Math. Soc., 2015; arXiv:1210.2368v3.
|
3 |
M. Davis and T. Januszkiewicz, Convex polytopes, Coxeter orbifolds and torus actions, Duke Math. J. 61 (1991), 417-451.
|
4 |
H. Kuwata, M. Masuda, and H. Zeng, Torsion in the cohomology of torus orbifolds, preprint (2016); arXiv:1604.03138v1.
|
5 |
Z. Lu and M. Masuda, Equivariant classication of 2-torus manifolds, Colloq. Math. 115 (2009), 171-188.
DOI
|
6 |
H. Nakayama and Y. Nishimura, The orientability of small covers and colloring simple polytopes, Osaka J. Math. 42 (2005), 243-256.
|
7 |
E. Soprunova and F. Sottile, Lower bounds in real algebraic geometry and ori- entability of real toric varieties, Discrete Comput. Geom. 50 (2013), 509-519.
DOI
|
8 |
D. Yeroshkin, On Poincare duality for orbifolds, preprint(2015); arXiv:1502.03384.
|