From a3bd2140d76d2ddcadf76812556f02cadb41b493 Mon Sep 17 00:00:00 2001 From: Jaron Kent-Dobias Date: Thu, 3 Feb 2022 10:46:20 +0100 Subject: New writing in first figure caption. --- stokes.tex | 6 +++++- 1 file changed, 5 insertions(+), 1 deletion(-) diff --git a/stokes.tex b/stokes.tex index 8b89104..095f6cb 100644 --- a/stokes.tex +++ b/stokes.tex @@ -161,7 +161,11 @@ action potentially has more stationary points. We'll call $\Sigma$ the set of its complex extension. \textbf{Right:} The stationary points of $\mathcal S$ in the complex-$\theta$ plane. In this example, $\Sigma=\{\blacklozenge,\bigstar,\blacktriangle,\blacktriangledown,\bullet,\blacksquare\}$ - and $\Sigma_0=\{\blacklozenge,\blacktriangledown\}$. + and $\Sigma_0=\{\blacklozenge,\blacktriangledown\}$. Symmetries exist + between the stationary points both as a result of the conjugation symmetry + of $\mathcal S$, which produces the vertical reflection, and because in the + pure 3-spin models $\mathcal S(-s)=-\mathcal S(s)$, which produces the + simultaneous translation and inversion symmetry. } \end{figure} -- cgit v1.2.3-70-g09d2