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Vesselin Dimitrov
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The kernel of a nef line bundle

Let $V$ be a complex projective variety and $L$ a nef line bundle on $V$ (i.e., $L$ has non-negative intersection number with all effective cycles on $V$). Denote, as usual, $\deg_LX = c_1(L)^{\dim{X}}.[X]$ for $X$ a subvariety of $V$, considered as a prime cycle of dimension $\dim{X}$.

Question. For subvarieties $X$ and $Y$ of $V$ with $\deg_LX = \deg_LY = 0$, does it follow that all components $Z$ of $X \cap Y$ necessarily have $\deg_LZ = 0$?

Vesselin Dimitrov
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