Bijections of sets
\begin{align*} \textup{Hom}_{\mathcal{P}\webleft (Y\webright )}\webleft (f_{*}\webleft (U\webright ),V\webright ) & \cong \textup{Hom}_{\mathcal{P}\webleft (X\webright )}\webleft (U,f^{-1}\webleft (V\webright )\webright ),\\ \textup{Hom}_{\mathcal{P}\webleft (X\webright )}\webleft (f^{-1}\webleft (U\webright ),V\webright ) & \cong \textup{Hom}_{\mathcal{P}\webleft (X\webright )}\webleft (U,f_{!}\webleft (V\webright )\webright ), \end{align*}
natural in $U\in \mathcal{P}\webleft (X\webright )$ and $V\in \mathcal{P}\webleft (Y\webright )$ and (respectively) $V\in \mathcal{P}\webleft (X\webright )$ and $U\in \mathcal{P}\webleft (Y\webright )$. In particular:
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The following conditions are equivalent:
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We have $f_{*}\webleft (U\webright )\subset V$.
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We have $U\subset f^{-1}\webleft (V\webright )$.
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The following conditions are equivalent:
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We have $f^{-1}\webleft (U\webright )\subset V$.
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We have $U\subset f_{!}\webleft (V\webright )$.