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Baikoussis, C., Blair, D. E, and Gouli-Andreou, F., Holomorphic legendre curves in the complex heisenberg group, 1998.BaikoussisC.BlairD. EGouli-AndreouF.Holomorphic legendre curves in the complex heisenberg group1998Search in Google Scholar
Blair, D. E. and A. Turgut Vanli, Corrected energy of distributions for 3-sasakian and normal complex contact manifolds, Osaka Journal of Mathematics, vol. 43, no. 1, pp. 193–200, 2006.BlairD. E.Turgut VanliA.Corrected energy of distributions for 3-sasakian and normal complex contact manifoldsOsaka Journal of Mathematics4311932002006Search in Google Scholar
Blair, D. E., Riemannian Geometry of Contact and Symplectic Manifolds, 2nd edn. Birkhäuser, Boston (2010).BlairD. E.Riemannian Geometry of Contact and Symplectic Manifolds2nd ednBirkhäuserBoston201010.1007/978-0-8176-4959-3Search in Google Scholar
Blair, D. E and Molina, V.M., Bochner and conformal flatness on normal complex contact metric manifolds, Ann Glob Anal Geom v.39, 249–258 (2011).BlairD. EMolinaV.M.Bochner and conformal flatness on normal complex contact metric manifoldsAnn Glob Anal Geom39249258201110.1007/s10455-010-9232-2Search in Google Scholar
Blair, D. E and Mihai, A., Symmetry in complex contact geometry, Journal of Mathematics, vol. 42, no. 2, p. 2012, 2012.BlairD. EMihaiA.Symmetry in complex contact geometryJournal of Mathematics4222012201210.1216/RMJ-2012-42-2-451Search in Google Scholar
Fernandez, M. and Gray, A., The Iwasawa manifold, in Differential Geometry Peñíscola 1985, pp. 157–159, Springer, 1986.FernandezM.GrayA.The Iwasawa manifoldinDifferential Geometry Peñíscola 1985157159Springer198610.1007/BFb0076628Search in Google Scholar
Foreman, B. J., Variational problems on complex contact manifolds with applications to twist or space theory. Michigan State University, 1996.ForemanB. J.Variational problems on complex contact manifolds with applications to twist or space theoryMichigan State University1996Search in Google Scholar
Foreman, B. J., Complex contact manifolds and hyperkähler geometry, Kodai Mathematical Journal, vol. 23, no. 1, pp. 12–26, 2000.ForemanB. J.Complex contact manifolds and hyperkähler geometryKodai Mathematical Journal2311226200010.2996/kmj/1138044153Search in Google Scholar
Ishihara, S. and Konishi, M., Real contact 3-structure and complex contact structure, Southeast Asian Bull. of Math., v.3, 151–161 (1979).IshiharaS.KonishiM.Real contact 3-structure and complex contact structureSoutheast Asian Bull. of Math.31511611979Search in Google Scholar
Ishihara, S. and Konishi, M., Complex almost contact manifolds, Kodai Math. J. v.3, 385–396 (1980).IshiharaS.KonishiM.Complex almost contact manifoldsKodai Math. J.3385396198010.2996/kmj/1138036261Search in Google Scholar
Kobayashi, S., Remarks on complex contact manifolds, Proc. Amer. Math. Soc. v.10, 164–167 (1959).KobayashiS.Remarks on complex contact manifoldsProc. Amer. Math. Soc.10164167195910.1090/S0002-9939-1959-0111061-8Search in Google Scholar
Korkmaz, B., Normality of complex contact manifolds, Rocky Mountain J. Math. v.30, 1343–1380 (2000).KorkmazB.Normality of complex contact manifoldsRocky Mountain J. Math.3013431380200010.1216/rmjm/1021477355Search in Google Scholar
Yano, K., On semi-symmetric metric connection, Rev. Roum. Math. Pures Appl., vol. 15, pp. 1579–1586, 1970.YanoK.On semi-symmetric metric connectionRev. Roum. Math. Pures Appl.15157915861970Search in Google Scholar
Turgut Vanli, A. and Blair, D. E., The booth-by-wang fibration of the Iwasawa manifold as a critical point of the energy, Monatshefte für Mathematik, vol. 147, no. 1, pp. 75–84, 2006.Turgut VanliA.BlairD. E.The booth-by-wang fibration of the Iwasawa manifold as a critical point of the energyMonatshefte für Mathematik14717584200610.1007/s00605-005-0336-xSearch in Google Scholar
Vanli, A. T., and Unal, I. Ricci semi-symmetric normal complex contact metric manifolds. Italian Journal of Pure and Applied Mathematics, 477.VanliA. T.UnalI.Ricci semi-symmetric normal complex contact metric manifoldsItalian Journal of Pure and Applied Mathematics477Search in Google Scholar
A. Turgut Vanli and I. Unal, Conformal, concircular, quasi-conformal and conharmonic flatness on normal complex contact metric manifolds, International Journal of Geometric Methods in Modern Physics, vol. 14, no. 05, p. 1750067, 2017.Turgut VanliA.UnalI.Conformal, concircular, quasi-conformal and conharmonic flatness on normal complex contact metric manifoldsInternational Journal of Geometric Methods in Modern Physics14051750067201710.1142/S0219887817500670Search in Google Scholar
