Effective nonvanishing for weighted complete intersections of codimension two
Abstract
We show Kawamata's effective nonvanishing conjecture (also known as the Ambro--Kawamata nonvanishing conjecture) holds for quasismooth weighted complete intersections of codimension 2. Namely, for a quasismooth weighted complete intersection X of codimension 2 and an ample Cartier divisor H on X such that H-KX is ample, the linear system |H| is nonempty.
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