Lemma 101.30.2. Let \mathcal{X} be a quasi-compact and quasi-separated algebraic stack. Then |\mathcal{X}| is a spectral topological space.
Proof. This is a special case of Lemma 101.30.1. \square
Lemma 101.30.2. Let \mathcal{X} be a quasi-compact and quasi-separated algebraic stack. Then |\mathcal{X}| is a spectral topological space.
Proof. This is a special case of Lemma 101.30.1. \square
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