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@article{2285877, author = {Chrysikos, Ioannis and Sakane, Yusuke}, article_location = {Amsterdam}, article_number = {February}, doi = {http://dx.doi.org/10.1016/j.geomphys.2020.103996}, keywords = {Homogeneous spaces; Invariant Einstein metrics; Non-Kahler C-spaces; Torus bundles}, language = {eng}, issn = {0393-0440}, journal = {Journal of Geometry and Physics}, note = {Nedovádět do RIV. Afiliace je mimo MU.}, title = {Homogeneous Einstein metrics on non-Kahler C-spaces}, url = {https://doi.org/10.1016/j.geomphys.2020.103996}, volume = {160}, year = {2021} }
TY - JOUR ID - 2285877 AU - Chrysikos, Ioannis - Sakane, Yusuke PY - 2021 TI - Homogeneous Einstein metrics on non-Kahler C-spaces JF - Journal of Geometry and Physics VL - 160 IS - February SP - 1-31 EP - 1-31 PB - Elsevier Science BV SN - 03930440 N1 - Nedovádět do RIV. Afiliace je mimo MU. KW - Homogeneous spaces KW - Invariant Einstein metrics KW - Non-Kahler C-spaces KW - Torus bundles UR - https://doi.org/10.1016/j.geomphys.2020.103996 N2 - We study homogeneous Einstein metrics on indecomposable non-Kahler C-spaces, i.e. even-dimensional torus bundles M = G/H with rank G > rank H over flag manifolds F = G/K of a compact simple Lie group G. Based on the theory of painted Dynkin diagrams we present the classification of such spaces. Next we focus on the family M-l,M-m,M-n := SU(l + m + n)/SU(l) x SU(m) x SU(n) , l, m, n is an element of Z(+) and examine several of its geometric properties. We show that invariant metrics on M-l,M-m,M-n are not diagonal and beyond certain exceptions their parametrization depends on six real parameters. By using such an invariant Riemannian metric, we compute the diagonal and the non-diagonal part of the Ricci tensor and present explicitly the algebraic system of the homogeneous Einstein equation. For general positive integers l, m, n, by applying mapping degree theory we provide the existence of at least one SU(l + m + n)-invariant Einstein metric on M-l,M-m,M-n. For l = m we show the existence of two SU(2m + n)-invariant Einstein metrics on M-m,M-m,M-n, and for l = m = n we obtain four SU(3n)-invariant Einstein metrics on M-n,M-n,M-n. We also examine the isometry problem for these metrics, while for a plethora of cases induced by fixed l, m, n, we provide the numerical form of all non-isometric invariant Einstein metrics. ER -
CHRYSIKOS, Ioannis and Yusuke SAKANE. Homogeneous Einstein metrics on non-Kahler C-spaces. \textit{Journal of Geometry and Physics}. Amsterdam: Elsevier Science BV, 2021, vol.~160, February, p.~1-31. ISSN~0393-0440. Available from: https://dx.doi.org/10.1016/j.geomphys.2020.103996.
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