Bachelor thesis about the Dold-Kan correspondence
https://github.com/Jaxan/Dold-Kan
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45 lines
1.5 KiB
45 lines
1.5 KiB
\documentclass[11pt]{amsproc}
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% a la fullpage
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\usepackage{geometry}
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\geometry{a4paper}
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\geometry{twoside=false}
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% Activate to begin paragraphs with an empty line rather than an indent
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\usepackage[parfill]{parskip}
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\setlength{\marginparwidth}{2cm}
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\newtheorem{theorem}{Theorem}[section]
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\newtheorem{definition}[theorem]{Definition}
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\newtheorem{lemma}[theorem]{Lemma}
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\input{../thesis/preamble}
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\begin{document}
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% For basic categorical picture of simplicial objects
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% $$ [0] \to [1] \to [2] \to [3] \to \ldots $$
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% $$\delta_i: [n] \to [n+1], k \mapsto \begin{cases} k & \text{if } k < i;\\ k+1 & \text{if } k \geq i. \end{cases} \hspace{0.5cm} 0 \leq i \leq n+1$$
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% $$\sigma_i: [n+1] \to [n], k \mapsto \begin{cases} k & \text{if } k \leq i;\\ k-1 & \text{if } k > i. \end{cases} \hspace{0.5cm} 0 \leq i \leq n$$
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% $$ X_0 \to X_1 \to X_2 \to X_3 $$
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% For geometric picture of simplicial objects
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% $$ 0 \tot{\delta_0} 1 \tot{\delta_1} 2 \tot{\delta_2} 3 \tot{\delta_3} \cdots $$
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% For the pictures in the presentation (singular chain complex)
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% $$ \cdots \tot{\del_2} C_2 \tot{\del_1} C_1 \tot{\del_0} C_0 $$
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% \reflectbox{\rotatebox[origin=c]{90}{\large $=$}}
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% $$ + - \mapsto $$
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% $$ \{ \} $$
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% For singular chain complex, face maps
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% $$ C_n(X) = \Z[\Hom{\cat{Top}}{\Delta^n}{X}] $$
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% $$ \Delta^2 \to X \sigma \circ \delta^1$$
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% $$ \Delta^1 \mono $$
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% $$ \delta^0 - \delta^1 + \delta^2 $$
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% For singular homology
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$$ X' \, X \subseteq \R^2 $$
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$$ \sigma_1 \sigma_2 \sigma_3 \tau $$
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\end{document}
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