Abstract
We investigate the existence of a holomorphic and isometric immersion in the complex projective space for the complete Ricci-flat Kähler metrics constructed by M. B. Stenzel in [15] on the cotangent bundle of a compact, rank one, globally symmetric space.
Funding Statement
This research has been financially supported by the Programme ``FIL-Quota Incentivante'' of University of Parma and co-sponsored by Fondazione Cariparma, by the PRIN project ``Real and Complex Manifolds: Topology, Geometry and holomorphic dynamics'' and by the group GNSAGA of INdAM.
Citation
Michela ZEDDA. "Stenzel's Ricci-flat Kähler metrics are not projectively induced." Osaka J. Math. 58 (4) 921 - 927, October 2021.
Information
