Definition 37.66.1. A scheme $X$ is ind-quasi-affine if every quasi-compact open of $X$ is quasi-affine. Similarly, a morphism of schemes $X \to Y$ is ind-quasi-affine if $f^{-1}(V)$ is ind-quasi-affine for each affine open $V$ in $Y$.
Definition 37.66.1. A scheme $X$ is ind-quasi-affine if every quasi-compact open of $X$ is quasi-affine. Similarly, a morphism of schemes $X \to Y$ is ind-quasi-affine if $f^{-1}(V)$ is ind-quasi-affine for each affine open $V$ in $Y$.
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