Stability of restrictions of cotangent bundles of irreducible Hermitian symmetric spaces of compact type
Abstract
It is known that the cotangent bundle Y of an irreducible Hermitian symmetric space Y of compact type is stable. Except for a few obvious exceptions, we show that if X ⊂ Y is a complete intersection such that Pic(Y) Pic(X) is surjective, then the restriction Y|X is stable. We then address some cases where the Picard group increases by restriction.
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