A family of Kähler-Einstein manifolds and metric rigidity of Grauert tubes (Q2723486)

An adapted to Riemannian manifold \((M,g)\) complex structure is a structure \(J\) on a subset of \(TM\) containing the zero section such that the map \(\psi_\gamma:{\mathbb C}\to TM\), \(\sigma+i\tau\mapsto\tau\dot\gamma(\sigma)\), is holomorphic for every geodesic \(\gamma\) on \(M\). For small \(r\) and real-analytic metric \(g\) such complex structure \(J\) on \(T^rM=\{X\in TM,\|X\|<r\}\) always exists and is unique. Moreover \(T^rM\) is a Stein manifold and admits a complete Kähler-Einstein metric \(h_r\). NEWLINENEWLINENEWLINEThe author proves that an isometry of two such metrics \(h_r\) on \(T^rM\) and \({\widetilde h}_s\) on \(T^s\widetilde M\) or a (anti)biholomorphism of the complex structures \(J\), \(\widetilde J\) is always induced by an isometry \((M,{1\over r}g)\to(\widetilde M,{1\over s}\widetilde g)\).