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$\tilde{\omega}$ is a differential form on $\tilde{S}$ and $\tilde{S}_{0}$ is an open subscheme of $\tilde{S}$, so it can only mean restriction I think.
$\tilde{\omega}$ is a differential form on $\tilde{S}$ and $\tilde{S}_{0}$ is an open subscheme of $\tilde{S}$, so it can only mean restriction I think.
$\tilde{\omega}$ is a differential form on $\tilde{S}$ and $\tilde{S}_{0}$ is an open subscheme of $\tilde{S}$, so it can only mean restriction.
$\tilde{\omega}$ is a differential form on $\tilde{S}$ and $\tilde{S}_{0}$ is an
open open subscheme of $\tilde{S}$, so it can only mean restriction I think.
$\tilde{\omega}$ is a differential on $\tilde{S}$ and $\tilde{S}_{0}$ is an
open subscheme of $\tilde{S}$, so it can only mean restriction I think.
$\tilde{\omega}$ is a differential form on $\tilde{S}$ and $\tilde{S}_{0}$ is an open subscheme of $\tilde{S}$, so it can only mean restriction I think.
