Harmonic maps of compact Kähler manifolds to exceptional local symmetric spaces of Hodge type and holomorphic liftings to complex homogeneous fibrations

Authors

  • Azniv Kasparian

Keywords:

abelian subspaces, complex homogeneous fibrations, equivariant Hermitian symmetric subspaces, exceptional Riemannian symmetric spaces of Hodge type, harmonic and holomorphic maps, Levi-Civita connections

Abstract

Let $M$ be a compact $K\ddot{a}hler$ manifold and $G/K$ be a non-Hermitian Riemannian symmetric space of Hodge type. Certain harmonic maps $f : M \rightarrow \Gamma \setminus G / K$ will be proved to admit holomorphic liftings $F_p : M \rightarrow \Gamma \setminus G / G \cap P$ to complex homogeneous fibrations, where $P$ are parabolic subgroups of $G^\mathbb{C}$. The work studies whether the images $F_P(M)=\Gamma_h \setminus G_h/K_h$ are local equivariantly embedded Hermitian symmetric subspaces of $\Gamma \setminus G / G \cap P$. For each of the cases examples of harmonic maps $f$ which do not holomorphic liftings are supplied.

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Published

2002-12-12

How to Cite

Kasparian, A. (2002). Harmonic maps of compact Kähler manifolds to exceptional local symmetric spaces of Hodge type and holomorphic liftings to complex homogeneous fibrations. Ann. Sofia Univ. Fac. Math. And Inf., 94, 97–121. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/194