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a a a a a a a a a a a above above a: all all also analogous analogue analogue and
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and and and and and any any any ${}^{\text{a}}$ppears ${}^{\text{a}} {}^{\text{r}} {}^{\text{e}}$ argument argument) As a{\it s} as as as a{\it s}${}^{\text{t}} {}^{\text{s}}$ associated assume a{\it s} sumption a{\it s} sumption
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be because because bide- bigraded Bockstein Bockstein. But But by by by by by by byby
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case case category category category category category {\it category} chain changes. classes.
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closed coho- coho- cohomology cohomology cohomology cohomology coincide complete
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complexes composition composition composition composition conclusion considered
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construction. correct corresponding corresponding corresponding covered
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cleduce defines degree degree degree denoted dimension dimension divisible do do
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equivalences, equivalent exact extension extension extension extension
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fact for for for form $\mathrm{F}$ from from
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general get give grees group group group group groups groups
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hand, has has has has has Here holds. homology homology homology. homotopy {\it homotopg}if image implies In In in in in in in in in in in in Indeed, inductive injective injective.injectivity injectivity integral introduce is is is is is is is is is is is is it it it its
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kernel
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latter Let Let Let Let Let like localization localizes long
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Margolis Margolis means means middle mo- mology mology MOREL morphism morphismmorphism motivic motivic motivic motivic motivic much much multiplication
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multiplication multiplication
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$H90(n-1,2)\mathrm{Z}/\ell\rightarrow \mathrm{Z}/\ell[1]i\in\{1,\ ..,\ n-3\}$ {\it k-varieties}, $m\in\{0,\ ..,\ n-1\}:\mathrm{Z}/\ell^{2}$-coefficients
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{\it Spec} $(L)\rightarrow Spec(k))0\rightarrow \mathrm{Z}/\ell\rightarrow \mathrm{Z}/l^{2}\rightarrow \mathrm{Z}/\ell\rightarrow 0).\tilde{H}_{B}^{*}(\underline{C}(X);\mathrm{Z}/\ell(*))$
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$kkp\ell Lmm\square XXk)\ell, \ell,$ ( $ X\ell.\ \pi$ : $\ell.m\ell.mn=0n\geq 0n\geq 1Q_{n}.\ Q_{\underline{a}}\Theta_{k}^{n} X|L\beta=Q_{0}\circ Q_{1}$. mod $\ell \mathrm{mod}\ pn>0.\ Q_{i+1}Q_{i+1}Q_{i+1}\Theta_{k}^{n}.\ DM(k)Q_{i+1}.\ Sm(k)\underline{C}(X) \underline{C}(X)2^{n-1}-1DM(k)$ : $SH(k).\ \mathrm{A}^{1}$-weak $\check{C}(Q_{\underline{a}})p^{2}\iota.e.\ Q_{n-2}\circ..DM^{eff}(k)Q_{i}\circ..\mathrm{o}Q_{1} \underline{C}(Q_{\underline{a}}).\ \underline{C}(Q_{\underline{a}}).\ \mathrm{v}_{m}$-points
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$H_{B}^{n+1}(\check{C}(Q_{\underline{a}}),\ \mathrm{Z}_{(2)}(n))$
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$ Hom_{DM(k)}(\mathrm{Z}/l,\ \mathrm{Z}/p(\ell^{n}-1))[2pn-1])\ell$ : $\tilde{H}_{B}^{*}(\underline{C}(X);\mathrm{Z}/\ell^{2}(*))\rightarrow\tilde{H}_{B}^{*+1}(\underline{C}(X);\mathrm{Z}/\ell^{2}(*))$
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$n_{*}: \tilde{H}_{B}^{*}(\underline{C}(X|L);\mathrm{Z}/p^{2}(*))\rightarrow\tilde{H}_{B}^{*}(\underline{C}(X);\mathrm{Z}/\ell^{2}(*))$
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$n^{*}$ : $\tilde{H}_{B}^{*}(\underline{C}(X);\mathrm{Z}/l^{2}(*))\rightarrow\tilde{H}_{B}^{*}(\underline{C}(X|L);\mathrm{Z}/p^{2}(*))$
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$[]\mathrm{evich}$ Nis- Nisnevich not notion
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Observe obvious of of of of of of of of of of of of of of of of of of of of of of ofof of of of of of of of of of of of of {\it of of of} On on on on on One One one one
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only operation operation operation operation operation. other
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$\mathrm{L}381)2.22)\mathit{5}.\mathit{1}\mathit{0}.7.127.12.7.\mathit{1}\mathit{2}.7.57.8$. ``nonlinear'' \'{e}tale \'{e}tale fiber fiber finite finitefirst first (as (by (induced (use
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point point point pointed point). preserves previous previous prime prime prime problemproblem, proceeds projection proof {\it Proof Proof} property prove prove prove
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quadric quite
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rational rational rational rational reduced reduced reduction relevant remains required
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respect respect Roughly
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oame same second separable sequences {\it sets} sheaves sheaves shift simplicial sketch sketch{\it smooth} So solve source speaking, {\it stable} subquadric suffices
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take target that that that that that that that that that The The The the the the thebhe the the the the the the the the the the the the the the the the the the the thethe the the the the the the the the the the the the the the the the the the the theihe the the the the the the the the the the the the the {\it The} Then then theorem
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fheorem theorem theorem theorem {\it Theorem theorem} theory This this this this this thisThus, tivic To To to to to to to to to to to to to to transfer transfer transfers.
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hriangulated trivial trivial
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Unfortunately, us us us use
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vanishes vanishes vanishes vanishes. vanishing
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way way, way. We we well. well. with with with with with with with works would
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$ 7_{}P\Gamma\cap$ zPro zrro zero
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