caa a22 4500 46911729X CHVBK 20180323133128.0 cr unu---uuuuu 170328e19921201xx s 000 0 eng 10.1007/BF02921577 doi (NATIONALLICENCE)springer-10.1007/BF02921577 Massmann Beate Ruhr-Universität Bochum, Universitätsstrasse 150, D-4630, Bochum, Germany aut Equivariant Kähler compactifications of homogeneous manifolds [Elektronische Daten] [Beate Massmann] A compact complex manifoldX is an equivariant compactification of a homogeneous manifoldG/H (G a connected complex Lie group,H a closed complex subgroup ofG), if there exists a holomorphic action ofG onX such that theG-orbit of some pointx inX is open and H is the isotropy group ofx. GivenG andH, for some groups (e.g.,G nilpotent) there are necessary and sufficient conditions for the existence of an equivariant Kähler compactification which are proven in this paper. CRC Press, Inc, 1992 compactification nationallicence homogeneous manifold nationallicence Lie group nationallicence The Journal of Geometric Analysis Springer-Verlag 2/6(1992-12-01), 555-574 1050-6926 2:6<555 1992 2 12220 https://doi.org/10.1007/BF02921577 text/html Onlinezugriff via DOI 1 research-article jats NATIONALLICENCE 856 40 https://doi.org/10.1007/BF02921577 text/html Onlinezugriff via DOI NATIONALLICENCE 100 1- Massmann Beate Ruhr-Universität Bochum, Universitätsstrasse 150, D-4630, Bochum, Germany aut NATIONALLICENCE 773 0- The Journal of Geometric Analysis Springer-Verlag 2/6(1992-12-01), 555-574 1050-6926 2:6<555 1992 2 12220 Metadata rights reserved Springer special CC-BY-NC licence nationallicence BK010053 XK010053 XK010000 NATIONALLICENCE NATIONALLICENCE NL-springer