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| author | kurchan.jorge <kurchan.jorge@gmail.com> | 2020-12-10 12:52:30 +0000 |
|---|---|---|
| committer | overleaf <overleaf@localhost> | 2020-12-10 12:52:37 +0000 |
| commit | ed7030569235796bd96acec289dc0cde37ea422c (patch) | |
| tree | 42dd09d6e9fcd11715abfd222c87f468bc153294 /bezout.tex | |
| parent | 3771908cde95f1b8470c06e2ed40bf29168986a1 (diff) | |
| download | PRR_3_023064-ed7030569235796bd96acec289dc0cde37ea422c.tar.gz PRR_3_023064-ed7030569235796bd96acec289dc0cde37ea422c.tar.bz2 PRR_3_023064-ed7030569235796bd96acec289dc0cde37ea422c.zip | |
Update on Overleaf.
Diffstat (limited to 'bezout.tex')
| -rw-r--r-- | bezout.tex | 2 |
1 files changed, 1 insertions, 1 deletions
@@ -113,7 +113,7 @@ Critical points are given by the set of equations: \begin{equation} \frac{c_p}{(p-1)!}\sum_{ i, i_2\cdots i_p}^NJ_{i, i_2\cdots i_p}z_{i_2}\cdots z_{i_p} = \epsilon z_i \end{equation} -which for given $\epsilon$ are a set pf $N$ equations (pluof degree $ +which for given $\epsilon$ are a set pf $N$ equations (plus the constraint) of degree $ Since $H$ is holomorphic, a point is a critical point of its real part if and only if it is also a critical point of its imaginary part. The number of critical points of $H$ is therefore the number of critical points of |