On the vector bundles associated to irreducible representations of cocompact lattices of SL(2,C)
Abstract
In this continuation of BM, we prove the following: Let ⊂ SL(2, C) be a cocompact lattice, and let : → GL(r, C) be an irreducible representation. Then the holomorphic vector bundle E SL(2, C)/ associated to is polystable. The compact complex manifold SL(2, C)/ has natural Hermitian structures; the polystability of E is with respect to these natural Hermitian structures.
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