rghthndsd
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Registered User
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Mar 10 |
comment |
Dualizing sheaf in mixed characteristic for regular schemes. I forgot to include: if you have a reference without using dualizing complex, this would be preferred, but not required. |
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Mar 10 |
comment |
Dualizing sheaf in mixed characteristic for regular schemes. The specific properties like local/global duality would be more helpful to me. The $X$ I have in mind is quasi-projective. |
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Mar 5 |
comment |
Dualizing sheaf in mixed characteristic for regular schemes. Thanks, this is exactly what I was looking for. Do you have a reference for this? |
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Mar 5 |
awarded | ● Editor |
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Mar 5 |
revised |
Dualizing sheaf in mixed characteristic for regular schemes. edited title |
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Mar 5 |
asked | Dualizing sheaf in mixed characteristic for regular schemes. |
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Feb 18 |
comment |
Structure theorem for etale maps I haven't checked the notes, but an etale morphism should induce a map $i : k(x) \rightarrow k(y)$. The degree (I believe) should be $[k(y) : i(k(x))]$. This need not be one (as the map $\mathbb{A}^1 \rightarrow \mathbb{A}^1$ sending $x \rightarrow x^n$ shows). |
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Feb 13 |
awarded | ● Enthusiast |
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Jan 22 |
asked | How to connect monoidal fans (Kato) to fans (Oda). |
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Dec 31 |
awarded | ● Citizen Patrol |
