On splittings of deformations of pairs of complex structures and holomorphic vector bundles

Abstract

We can show that the Kuranishi space of a pair (M,E) of a compact K\"ahler manifold M and its flat Hermitian vector bundle E is isomorphic to the direct product of the Kuranishi space of M and the Kuranishi space of E. We study non-K\"ahler case. We show that the Kuranishi space of a pair (M,E) of a complex parallelizable nilmanifold M and its trivial holomorphic vector bundle E is isomorphic to the direct product of the Kuranishi space of M and the Kuranishi space of E. We give examples of pairs (M,E) of nilmanifolds M with left-invariant abelian complex structures and their trivial holomorphic line bundles E such that the Kuranishi spaces of pairs (M,E) are not isomorphic to direct products of the Kuranishi spaces of M and the Kuranishi spaces of E.

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