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If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G.A.G.R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:

The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:

Köpf, Ursula. Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G.A.G.R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:
Köpf, Ursula. Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G.A.G.R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.

The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:

Köpf, Ursula. Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).
added 2 characters in body
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If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G. A. G. R..À propos de G.A.G.R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
See [link][1].

The original source for the result, listed as [4] in Jarraud's note, seems to be:

The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:
Ursula Köpf, Ursula. Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G. A. G. R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
See [link][1].

The original source for the result, listed as [4] in Jarraud's note, seems to be:

Ursula Köpf, Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G.A.G.R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
The original source for the result, listed as $[4]$ in Jarraud's note, seems to be:
Köpf, Ursula. Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).
added reference to Köpf
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R.P.
R.P.
  • 4.7k
  • 19
  • 43
  • 67

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. "À propos de G. A. G. R.."À propos de G. A. G. R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
[Link][1]See [link][1].

The original source for the result, listed as [4] in Jarraud's note, seems to be:

Ursula Köpf, Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. "À propos de G. A. G. R.." Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
[Link][1].

If $k$ is a field that is complete with respect to some ultrametric valuation, then there is the "GAGR" (i.e. géométrie algébrique et géométrie rigide) theorem. A succinct explanation (in French, without proof) is:

Jarraud, Pierre. À propos de G. A. G. R.. Groupe de travail d'analyse ultramétrique 11 (1983-1984): 1-4.
See [link][1].

The original source for the result, listed as [4] in Jarraud's note, seems to be:

Ursula Köpf, Über eigentliche Familien algebraischer Varietäten über affinoïden Räumen, Schriftenreihe Univ. Münster, 2. Serie, Heft 7 (1974).
Source Link
R.P.
R.P.
  • 4.7k
  • 19
  • 43
  • 67