Christian Merten
4 vuotta sitten
3 muutettua tiedostoa jossa 87 lisäystä ja 12 poistoa
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BINsose2022/bachelorarbeit/arbeit.pdf
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sose2022/bachelorarbeit/arbeit.pdf
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sose2022/bachelorarbeit/arbeit.tex
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| @@ -21,6 +21,32 @@ | |||
| \section{Einleitung} | |||
| Aus der kommutativen Algebra ist für einen kommutativen Ring $A$ und $A$-Moduln | |||
| $M, N, P$ die Adjunktion | |||
| \[ | |||
| \text{Hom}_A(M \otimes_A N, P) = \text{Hom}_A(M, \text{Hom}_A(N, P)) | |||
| \] bekannt. In der klassischen homologischen Algebra definiert man außerdem | |||
| die Funktoren $\text{Ext}_A^{i}(N, -)$ und $\text{Tor}_A^{i}(-, N)$, als | |||
| Ableitungen der Funktoren $\text{Hom}_A(N, -)$ und $- \otimes_A N$. Nun stellt sich | |||
| die Frage, ob zwischen diesen ein analoges Adjunktionsresultat gilt. | |||
| Die Antwort ist nein, denn angenommen $\text{Ext}^{i}(N, -)$ wäre rechtsadjungiert, dann | |||
| folgte, dass $\text{Ext}_A^{i}(N, -)$ linksexakt sei. Die exakte Folge | |||
| \[ | |||
| \begin{tikzcd} | |||
| 0 \arrow{r} & \Z \arrow{r} & \Z \arrow{r} & \Z / 2 \Z \arrow{r} & 0 | |||
| \end{tikzcd} | |||
| \] in $\Z$-Mod lieferte dann die exakte Folge | |||
| \[ | |||
| \begin{tikzcd} | |||
| \text{Ext}^{0}_{\Z}(\Z, \Z / 2 \Z) \arrow{r} & \text{Ext}^{1}_{\Z}(\Z, \Z) \arrow{r} | |||
| & \text{Ext}^{1}_{\Z}(\Z, \Z) | |||
| \end{tikzcd} | |||
| .\] Da $\text{Ext}^{0}_{\Z}(\Z, \Z / 2 \Z) = \text{Hom}_{\Z}(\Z, \Z / 2 \Z) \neq 0$, ist | |||
| jedoch | |||
| \newpage | |||
| \section{Derivierte Kategorien und abgeleitete Funktoren} | |||
| Seien $\mathcal{A}, \mathcal{B}$ abelsche Kategorien und sei $F\colon \mathcal{A} \to | |||
| @@ -2187,17 +2213,20 @@ Jetzt können wir alles zusammentragen und erhalten: | |||
| $\com{\text{Hom}}(\com{N}, \com{P})$ K-injektiv ist. | |||
| \end{proof} | |||
| % TODO: zitate richtig machen | |||
| \begin{thebibliography}{9} | |||
| \bibitem{hartshorne} | |||
| Hartshorne, R. \emph{Residues and duality.} Lecture Notes in Math. 20, Springer-Verlag (1966) | |||
| \bibitem{spaltenstein} | |||
| %N. Spaltenstein. Resolutions of unbounded complexes. \emph{Composito Mathematica 65}. (1988) | |||
| Spaltenstein, N. \emph{Resolutions of unbounded complexes.} Compositio Mathematica, Tome 65 (1988) no. 2, pp. 121-154. %http://www.numdam.org/item/CM_1988__65_2_121_0/ | |||
| \bibitem{set-theoretic} | |||
| %Charles A. Weibel. An introduction to homological algebra. \emph{Cambridge studies in advanced mathematics}. 38 (1988) | |||
| Weibel, C. \emph{An Introduction to Homological Algebra}. Cambridge Studies in Advanced Mathematics. Cambridge: Cambridge University Press (1994).% doi:10.1017/CBO9781139644136 | |||
| \end{thebibliography} | |||
| \bibliographystyle{plain} | |||
| \bibliography{refs} | |||
| %% TODO: zitate richtig machen | |||
| %\begin{thebibliography}{9} | |||
| %\bibitem{hartshorne} | |||
| %Hartshorne, R. \emph{Residues and duality.} Lecture Notes in Math. 20, Springer-Verlag (1966) | |||
| %\bibitem{spaltenstein} | |||
| %%N. Spaltenstein. Resolutions of unbounded complexes. \emph{Composito Mathematica 65}. (1988) | |||
| %Spaltenstein, N. \emph{Resolutions of unbounded complexes.} Compositio Mathematica, Tome 65 (1988) no. 2, pp. 121-154. %http://www.numdam.org/item/CM_1988__65_2_121_0/ | |||
| %\bibitem{set-theoretic} | |||
| %%Charles A. Weibel. An introduction to homological algebra. \emph{Cambridge studies in advanced mathematics}. 38 (1988) | |||
| %Weibel, C. \emph{An Introduction to Homological Algebra}. Cambridge Studies in Advanced Mathematics. Cambridge: Cambridge University Press (1994).% doi:10.1017/CBO9781139644136 | |||
| % | |||
| %\end{thebibliography} | |||
| \end{document} | |||
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| @@ -0,0 +1,46 @@ | |||
| @article {spaltenstein, | |||
| AUTHOR = {Spaltenstein, N.}, | |||
| TITLE = {Resolutions of unbounded complexes}, | |||
| JOURNAL = {Compositio Math.}, | |||
| FJOURNAL = {Compositio Mathematica}, | |||
| VOLUME = {65}, | |||
| YEAR = {1988}, | |||
| NUMBER = {2}, | |||
| PAGES = {121--154}, | |||
| ISSN = {0010-437X}, | |||
| MRCLASS = {18E25 (32C35)}, | |||
| MRNUMBER = {932640}, | |||
| MRREVIEWER = {Michael M. Kapranov}, | |||
| URL = {http://www.numdam.org/item?id=CM_1988__65_2_121_0}, | |||
| } | |||
| @book {hartshorne, | |||
| AUTHOR = {Hartshorne, Robin}, | |||
| TITLE = {Residues and duality}, | |||
| SERIES = {Lecture Notes in Mathematics, No. 20}, | |||
| NOTE = {Lecture notes of a seminar on the work of A. Grothendieck, | |||
| given at Harvard 1963/64, | |||
| With an appendix by P. Deligne}, | |||
| PUBLISHER = {Springer-Verlag, Berlin-New York}, | |||
| YEAR = {1966}, | |||
| PAGES = {vii+423}, | |||
| MRCLASS = {14.55}, | |||
| MRNUMBER = {0222093}, | |||
| MRREVIEWER = {R. L. Knighten}, | |||
| } | |||
| @book {set-theoretic, | |||
| AUTHOR = {Weibel, Charles A.}, | |||
| TITLE = {An introduction to homological algebra}, | |||
| SERIES = {Cambridge Studies in Advanced Mathematics}, | |||
| VOLUME = {38}, | |||
| PUBLISHER = {Cambridge University Press, Cambridge}, | |||
| YEAR = {1994}, | |||
| PAGES = {xiv+450}, | |||
| ISBN = {0-521-43500-5; 0-521-55987-1}, | |||
| MRCLASS = {18-01 (16-01 17-01 20-01 55Uxx)}, | |||
| MRNUMBER = {1269324}, | |||
| MRREVIEWER = {Kenneth A. Brown}, | |||
| DOI = {10.1017/CBO9781139644136}, | |||
| URL = {https://doi.org/10.1017/CBO9781139644136}, | |||
| } | |||