By Eduard Casas-Alvero, Gerald E. Welters, Sebastian Xambo-Descamps
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66 (1980) 109–139. 12. W. P´erez, Conformal properties on classical minimal surface theory, In: Surveys in Differential Geometry (Volume IX: Eigenvalues of Laplacians and other geometric operators, (A. T. ) International Press). 13. J. P´erez, Parabolicity and minimal surfaces, Proceedings of the 2002 Summer School“The global theory of minimal surfaces” (Clay Mathematical Institute & University of California at Berkeley, MSRI), to appear. Differential Geometry and its Applications Proc. , in Honour of Leonhard Euler, Olomouc, August 2007 c 2008 World Scientific Publishing Company, pp.
10. A. Y. Hsiang, Equivariant geometry and Kervaire spheres, Trans. Amer. Math. Soc. 304 (1987) 207–227. 11. M. Kerr, New examples of homogeneous Einstein metrics, Michigan J. Math. 45 (1998) 115–134. 12. V. Alekseevsky, I. Dotti and C. Ferraris, Homogeneous Ricci positive 5manifolds, Pacific J. Math. 175 (1996) 1–12. 13. A. V. G. Nikonorov, Invariant Einstein metrics on some homogeneous spaces of classical Lie groups, to appear in Canadian J. DG/0612504v2. Differential Geometry and its Applications Proc.
Jensen, The scalar curvature of left invariant Riemannian metrics, Indiana J. Math. 20 (1971) 1125–1144. 4. M. Wang and W. Ziller, Existence and Non-existence of Homogeneous Einstein Metrics, Invent. Math. 84 (1986) 177–194. 5. C. B¨ ohm, M. Wang and W. Ziller, A variational approach for compact homogeneous Einstein manifolds, Geom. Func. Anal. 14 (2004) 681–733. 6. C. B¨ ohm, Homogeneous Einstein metrics and simplicial complexes, J. Diff. Geom. 67 (2004) 79–165. 7. S. Kobayashi, Topology of positive pinched K¨ ahler manifolds, Tˆ ohoku Math.
Algebraic Geometry. Proc. conf. Sitges (Barcelona), 1983 by Eduard Casas-Alvero, Gerald E. Welters, Sebastian Xambo-Descamps