Aq-components of geometric classes in compact Hermitian locally symmetric spaces
Abstract
Let G/K be a compact Hermitian locally symmetric space, where G is simple. We study the components of a de Rham cohomology class of G/K, with respect to the Matsushima decomposition, where the class is obtained by taking Poincar\'e dual of a totally geodesic complex analytic submanifold. Using an extension of the vanishing result of Kobayashi and Oda, we specify the existence of certain components of such cohomology classes when G=SU(p,q), 5 p q.
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