(12) Shintar\^o Kuroki, Mikiya Masuda and Li Yu: Small cover, infra-solvmanifold and curvature, Forum Mathematicum, Volume 27, Issue 5 (2015), Pages 2981--3004. (ISSN (Online) 1435-5337, ISSN (Print) 0933-7741, DOI: 10.1515/forum-2013-0084, January 2014); OCAMI preprint series 11-12 or arXiv:1111.2174
(11) Shintar\^o Kuroki and DongYoup Suh: Cohomological non-rigidity of eight-dimensional complex projective towers, Algebraic & Geometric Topology 15-2 (2015), 769--782. DOI 10.2140/agt.2015.15.769. [pdf](version_2014-Jul.25th); OCAMI preprint series 13-12
(10) Shintar\^o Kuroki and DongYoup Suh: Complex projective towers and their cohomological rigidity up to dimension six, Proceedings of Steklov Institute of Mathematics, 2014, Vol. 286, Issue 1, 285--307. (ISSN: 0081-5438, DOI: 10.1134/S0081543814060170) [pdf]; OCAMI preprint series 13-11
(9) Shintar\^o Kuroki and Li Yu: On the equivalence of several definitions of compact infra-solvmanifolds , Proceedings of the Japan Academy, Ser. A Mathematical Sciences, 2013, Vol. 89, No 9, 114-118. (ISSN(Print): 0386-2194, DOI: 10.3792/pjaa.89.114) [pdf], OCAMI preprint series 13-5 or arXiv:1305.4270
(8) Shintar\^o Kuroki: Equivariant cohomology distinguishes the geometric structures of toric hyperK\"ahler manifolds, Proceedings of the Steklov Institute of Mathematics, 2011, Vol. 275, 251--283. (ISSN(Print): 0081-5438, ISSN(Online): 1531-8605, DOI: 10.1134/S0081543811080189) [pdf]; OCAMI preprint series 10-18
(7) Suyoung Choi and Shintar\^o Kuroki: Topological classification of torus manifolds which have codimension one extended actions, Algebraic & Geometric Topology, 11, (2011), 2655--2679. (ISSN(Electronic): 1472-2739, ISSN(Print): 1472-2747, DOI: 10.2140/agt.2011.11.2655) arXiv:0906.1335 or OCAMI preprint series 09-9
(6) Shintar\^o Kuroki: Classification of torus manifolds with codimension one extended actions, Transformation Groups: Volume 16, Issue 2 (2011), 481--536. (ISSN(Print): 1083-4362, ISSN(Online): 1531-586X, DOI: 10.1007/s00031-011-9136-7) [pdf]; OCAMI preprint series 10-16
(5) Shintar\^o Kuroki: Operations on three dimensional small covers, Chinese Annals of Mathematics, Series B, Vol 31, no. 3, 393--410 (2010). (ISSN(Print): 0252-9599, ISSN(Online): 1860-6261, DOI: 10.1007/s11401-008-0417-y) OCAMI preprint series 09-6
(4) Shintar\^o Kuroki: Characterization of homogeneous torus manifolds, Osaka Journal of Mathematics, Vol 47, no. 1, 285--299 (2010). (ISSN(Print): 0030-6126) OCAMI preprint series 09-3
(3) Shintar\^o Kuroki: Classification of compact transformation groups on complex quadrics with codimension one orbits, Osaka Journal of Mathematics, Vol 46, no. 1, 21--85 (2009). (ISSN(Print): 0030-6126) [pdf]
(2) Shintar\^o Kuroki: On SL(3,R)-action on 4-sphere, the Journal of Fundamental and Applied Mathematics. 11 (2005), no. 5, 99--105., translation in Journal of Mathematical Sciences (N.Y.) 146 (2007), no. 1, 5518--5522. (ISSN(Print): 1072-3374, ISSN(Online): 1573-8795, DOI: 10.1007/s10958-007-0365-1) [pdf]
(1) Shintar\^o Kuroki: On the construction of smooth SL(m,H)\times SL(n,H)-actions on S^{4(m+n)-1}, Bulletin of Yamagata University, Yamagata, Japan (Natural Science) Vol. 15, No. 3 February, 2003, 49--59.
(2) Shintar\^o Kuroki: GKM manifold, submitted. [pdf]
(1) Shintar\^o Kuroki: On projective bundles over small covers (a survey), GROUP ACTIONS AND HOMOGENEOUS SPACES. Proceedings of the International Conference Bratislava Topology Symposium "Group Actions and Homogeneous Spaces", September 7-11, 2009, Comenius University, Bratislava, Slovakia, 43--60 (2010). [pdf]; OCAMI preprint series 10-7
(1) Shintar\^o Kuroki: Introduction to GKM theory, Trends in Mathematics - New Series Vol 11 No 2, 113--129 (2009). [pdf]
(15) Shintar\^o Kuroki: A remark on torus graph with root systems of type A, RIMS Kokyuroku 1968, 55--59 (2015). [pdf]
(14) Shintar\^o Kuroki: Classifications of homogeneous complexity one GKM manifolds and GKM graphs with symmetric group actions, RIMS Kokyuroku 1922, 135--146 (2014). [pdf]
(13) Shintar\^o Kuroki: A topological definition of hypertoric manifolds and its equivariant cohomology, Trends in Mathematics - New Series Vol 12 No 1, 135--138 (2010). [pdf]
(12) Shintar\^o Kuroki: GKM graphs induced by GKM manifolds with SU(l+1)-symmetries. Trends in Mathematics - New Series Vol 12 No 1, 103--113 (2010). [pdf]
The previous version (extended abstract): GKM graphs induced by GKM manifolds with SU(2)-symmetries. [pdf]
(11) Shintar\^o Kuroki: On group actions with codimension one orbits, The 57th Topology Symposium proceedings, 13--22 (2010). (Japanese) [pdf]
(10) Shintar\^o Kuroki: Equivariant cohomology determines hypertoric manifold, RIMS kokyuroku 1670, 107--116 (2009). [pdf]
(9) Shintar\^o Kuroki: Remarks on McGavran's paper and Nishimura's result, Trends in Mathematics - New Series Vol 10 No 1, 77--79 (2008). [ps]
(8) Shintar\^o Kuroki: On 8-manifolds with SU(3)-actions, RIMS Kokyuroku 1569, 81--93 (2007). [pdf]
(7) Shintar\^o Kuroki: On transformation groups of torus manifolds, RIMS Kokyuroku 1540, 67--78 (2007). (Japanese)
(6) Shintar\^o Kuroki: On transformation groups which act on torus manifolds, Proceedings of 33rd Symposium on Transformation Groups, 10--26 (2007). [pdf]
(5) Shintar\^o Kuroki: Classification of compact group actions on torus manifolds which have codimension 0 or 1 orbits, Hokkaido university Technical report series in Mathematics, Series #117, The 3rd COE Conference for Young Researchers -CCYR3-, 177--184 (2007). (Japanese) [pdf]
(4) Shintar\^o Kuroki: Hypertorus graph and its equivariant cohomology, RIMS Kokyuroku 1517, 120--135 (2006). (Japanese)
(3) Shintar\^o Kuroki: On classification of compact Lie groups which act on complex quadrics with codimension one orbits, Proceedings of the 2nd Kinosaki-shinjin-seminar, 256--261 (2005). (Japanese)
(2) Shintar\^o Kuroki: On the SL(3,R)-action on 4-sphere, RIMS Kokyuroku 1393, 79--81 (2004).
(1) Shintar\^o Kuroki: Classification of compact transformation groups on complex quadrics with codimension one orbits, RIMS Kokyuroku 1343, 10--24 (2003).
(8)-(b) Shintar\^o Kuroki: GKM manifold - survey. [pdf]
(8)-(a) Shizuo Kaji and Shintar\^o Kuroki: GKM manifold - definition. [pdf]
The previous (2014) versions of (2) in Refereed Proceedings and Articles.
(7) Shintar\^o Kuroki: Two classifications of simply connected 6-dimensional torus manifolds with vanishing odd degree cohomology. [pdf]; OCAMI preprint series 13-3 (WARNING: There are several mistakes in this paper.)
This first part of this paper has been published as (13). There are some mistakes in the latter part of this version.
(6) Shintar\^o Kuroki and DongYoup Suh: Classification of complex projective towers up to dimension 8 and their cohomological rigidity. OCAMI preprint series 11-22 (WARNING: There are mistakes in this version for the classification of 8-dim CP-tower.) or arXiv:1203.4403
This paper has been split into the published papers (10) and (11).
(5)-(b) Shintar\^o Kuroki: Classification of torus manifolds with codimension one extended actions. OCAMI preprint series 09-5
(5)-(a) Shintar\^o Kuroki: Classification of quasitoric manifolds with codimension one extended actions. OCAMI preprint series 09-4
Two papers above have been absorbed by the published paper (6). In these papers, I just used the Uchida's method to prove the main theorem.
(4) Shintar\^o Kuroki: Hypertorus graphs and graph equivariant cohomologies, [pdf].
The previous (2010) version of arXiv:2106.11598 with Uma.
(3) Shintar\^o Kuroki: Research on Toric Topology, Postdoctor Research Working Report in Fudan University, pp131 (2009). [ps]
Summary of my research when I was a postdoctor in Fudan University. I wrote about extended actions of torus manifolds, operations on small covers, and projective bundles over small covers.
(2) Ikumitsu Nagasaki and Shintar\^o Kuroki (editors) RIMS Kokyuroku 1569 (2007): The theory of transformation groups and its applications, Research Institute for Mathematical Sciences, Kyoto University: pp179 (2007).
This is the proceeding of RIMS workshop which I co-organized.
(1) Shintar\^o Kuroki: Classification of Transformation groups, PhD thesis in Osaka City University, pp90 (2006) [pdf]
This is my Ph.D thesis. I wrote about cohomogeneity one actions on rational cohomology complex quadrics, and hypertorus graphs (GKM graphs).