![Examples of Fields of p-Cohomological Dimension at most 1](https://i.ytimg.com/vi/dDxVE52fIYI/hq720.jpg?sqp=-oaymwE9COgCEMoBSFryq4qpAy8IARUAAAAAGAElAADIQj0AgKJDeAHwAQH4AdQGgALgA4oCDAgAEAEYfyATKCcwDw==\u0026rs=AOn4CLCVB5jnXAD3fjoNa1PRLMtitG27sQ)
Examples of Fields of p-Cohomological Dimension at most 1
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Cohomological Dimension of a Field (part 1): p-primary part of Brauer group
![Cohomological Dimension of Pro p groups](https://i.ytimg.com/vi/t-LiPMMtZ0o/hq720.jpg?sqp=-oaymwE9COgCEMoBSFryq4qpAy8IARUAAAAAGAElAADIQj0AgKJDeAHwAQH4AdQGgALgA4oCDAgAEAEYfyATKCcwDw==\u0026rs=AOn4CLAkoeqEy3bbGEKflMTq7f8cQrlbyQ)
Cohomological Dimension of Pro p groups
![Cohomological Dimension of fields of characteristic p](https://i.ytimg.com/vi/sboRq-fLLwQ/hqdefault.jpg?sqp=-oaymwEwCKgBEF5IWvKriqkDIwgBFQAAiEIYAfABAfgB1AaAAuADigIMCAAQARh_IBMoJzAP\u0026rs=AOn4CLB34Dr1m-UhZgogY4JEeccbmDoQFQ)
Cohomological Dimension of fields of characteristic p
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Cohomological Dimension of a field (part 3) More on Norm \u0026 Brauer Group of cyclic extension
![Cohomological Dimension of Subgroups](https://i.ytimg.com/vi/ACAFqhlr_Vo/hq720.jpg?sqp=-oaymwEjCOgCEMoBSFryq4qpAxUIARUAAAAAGAElAADIQj0AgKJDeAE=\u0026rs=AOn4CLBI7YtowDCKFnuqEk4f2HZb5MgVIw)
Cohomological Dimension of Subgroups
![Cohomological representations of real reductive groups](https://i.ytimg.com/vi/ACAFqhlr_Vo/hqdefault_12333.jpg?sqp=-oaymwEjCNACELwBSFryq4qpAxUIARUAAAAAGAElAADIQj0AgKJDeAE=\u0026rs=AOn4CLAqXVUAwLA7gqKDZIAqeBUJ5gH0CQ)
Cohomological representations of real reductive groups
![Burt Totaro, Cohomological invariants in positive characteristic](https://i.ytimg.com/vi/doWHs26XqtY/hq720.jpg?sqp=-oaymwEjCOgCEMoBSFryq4qpAxUIARUAAAAAGAElAADIQj0AgKJDeAE=\u0026rs=AOn4CLBqlAP9GsQj3j2ZUm6MxBsjbQ-h5A)
Burt Totaro, Cohomological invariants in positive characteristic
![Kęstutis Česnavičius - Purity for Flat Cohomology](https://i.ytimg.com/vi/doWHs26XqtY/hqdefault_15000.jpg?sqp=-oaymwEjCNACELwBSFryq4qpAxUIARUAAAAAGAElAADIQj0AgKJDeAE=\u0026rs=AOn4CLCPHtxazcM3HUM5x60J9BC4ky8_rw)
Kęstutis Česnavičius - Purity for Flat Cohomology
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Cohomological Dimension Definition (part 2): versus Strict Cohomological Dim
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Cohomological invariants of algebraic groups III
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Juhani Kovisto talk group actions on Banch spaces and L^p-cohomology
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Cohomological Dimension of Profinite Completion of Z (part 2): Dimension Shifting
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[Cohomology and Brauer Group] 1. Factor Sets- precursors of cocycles
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Cohomological invariants of algebraic groups I
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Cohomological invariants of n-dimensional quadratic forms in I^3
![Cohomological Dimension of a Field (part 2) Norm and Brauer Group](https://i.ytimg.com/vi/)
Cohomological Dimension of a Field (part 2) Norm and Brauer Group
قد يعجبك أيضا
Examples -
of -
Fields -
of -
p-Cohomological -
Dimension -
at -
most -
1 -
Cohomological -
Dimension -
of -
a -
Field -
(part -
1): -
p-primary -
part -
of -
Brauer -
group -
Cohomological -
Dimension -
of -
Pro -
p -
groups -
Cohomological -
Dimension -
of -
fields -
of -
characteristic -
p -
Cohomological -
Dimension -
of -
a -
field -
(part -
3) -
More -
on -
Norm -
\u0026 -
Brauer -
Group -
of -
cyclic -
extension -
Cohomological -
Dimension -
of -
Subgroups -
Cohomological -
representations -
of -
real -
reductive -
groups -
Burt -
Totaro, -
Cohomological -
invariants -
in -
positive -
characteristic -
Kęstutis -
Česnavičius -
- -
Purity -
for -
Flat -
Cohomology -
Cohomological -
Dimension -
Definition -
(part -
2): -
versus -
Strict -
Cohomological -
Dim -
Cohomological -
invariants -
of -
algebraic -
groups -
III -
Juhani -
Kovisto -
talk -
-
group -
actions -
on -
Banch -
spaces -
and -
L^p-cohomology -
Cohomological -
Dimension -
of -
Profinite -
Completion -
of -
Z -
(part -
2): -
Dimension -
Shifting -
[Cohomology -
and -
Brauer -
Group] -
1. -
Factor -
Sets- -
precursors -
of -
cocycles -
Cohomological -
invariants -
of -
algebraic -
groups -
I -
Cohomological -
invariants -
of -
n-dimensional -
quadratic -
forms -
in -
I^3 -
Cohomological -
Dimension -
of -
a -
Field -
(part -
2) -
Norm -
and -
Brauer -
Group -