blog:2022-12-09
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| blog:2022-12-09 [2022/12/09 19:48] – pzhou | blog:2022-12-09 [2023/06/25 15:53] (current) – external edit 127.0.0.1 | ||
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| $$ T_{-1} \to T_0 \gets T_{1} = (T_{-1} \oplus T_0[-1] \oplus T_{1}, \delta). $$ | $$ T_{-1} \to T_0 \gets T_{1} = (T_{-1} \oplus T_0[-1] \oplus T_{1}, \delta). $$ | ||
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| + | Then, let's consider the figure 8. What is my $\Omega$? Let's say, we use $\Omega = dz$. I don't want to put extra weird stuff around my puncture. | ||
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| + | How to make sense of an immersed Lagrangian? That looks really. | ||
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| + | oh well, the homology class of $L$ is not trivial in the ambiant space. So we don't | ||
blog/2022-12-09.1670615309.txt.gz · Last modified: 2023/06/25 15:53 (external edit)