Abstract
In this short note, we consider the conjecture that the log canonical divisor (resp.\ the anti-log canonical divisor) $K_X + \Delta$ (resp.\ $-(K_X + \Delta)$) on a pair $(X, \Delta)$ consisting of a complex projective manifold $X$ and a reduced simply normal crossing divisor $\Delta$ on $X$ is ample if it is numerically positive. More precisely, we prove the conjecture for $K_X + \Delta$ with $\Delta \neq 0$ in dimension $4$ and for $-(K_X + \Delta)$ with $\Delta \neq 0$ in dimension $3$ or $4$.
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