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1 files changed, 6 insertions, 4 deletions
diff --git a/ising_scaling.tex b/ising_scaling.tex
index 00de5e3..7fa1ae6 100644
--- a/ising_scaling.tex
+++ b/ising_scaling.tex
@@ -182,7 +182,7 @@ use $\xi=u_h|u_t|^{-\Delta}$ and $\eta=u_t|u_h|^{-1/\Delta}$.
The analyticity of the free energy at places away from the critical point
implies that the functions $\mathcal F_\pm$ and $\mathcal F_0$ have power-law
expansions of their arguments about zero, the result of so-called Griffiths
-analyticity. For instance, when $u_t$ goes to zero for nonzero $u_h$ there is
+analyticity \cite{Griffiths_1967_Thermodynamic}. For instance, when $u_t$ goes to zero for nonzero $u_h$ there is
no phase transition, and the free energy must be an analytic function of its
arguments. It follows that $\mathcal F_0$ is analytic about zero. This is not
the case at infinity: since
@@ -909,7 +909,7 @@ values of both are plotted.
Free parameters in the fit of the parametric coordinate transformation and
scaling form to known values of the scaling function series coefficients
for $\mathcal F_\pm$. The fit at stage $n$ matches those coefficients up to
- and including order $n$. Error estimates are difficult to quantify directly.
+ and including order $n$. Uncertainty estimates are difficult to quantify directly.
} \label{tab:fits}
\end{table}
@@ -1026,7 +1026,7 @@ Fig.~\ref{fig:phi.series}.
The series coefficients for the scaling function $\mathcal F_-$ as a
function of polynomial order $m$. The numeric values are from Table
\ref{tab:data}, and those of Caselle \textit{et al.} are from the most
- accurate scaling function listed in \cite{Caselle_2001_The}. The deviation at high polynomial order illustrates the lack of the essential singularity in Caselle's form.
+ accurate scaling function listed in \cite{Caselle_2001_The}. The deviation at high polynomial order illustrates the lack of the essential singularity in the form of Caselle \textit{et al.}.
} \label{fig:glow.series}
\end{figure}
@@ -1199,7 +1199,9 @@ the ratio.
Sequential ratios of the series coefficients of the scaling function
$\mathcal F_-$ as a function of inverse polynomial order $m$. The
extrapolated $y$-intercept of this plot gives the radius of convergence of
- the series, which should be zero due to the essential singularity (as seen in the known numeric values and in this work). Cassel {\em et al} do not incorporate the essential singularity.
+ the series, which should be zero due to the essential singularity (as seen
+ in the known numeric values and in this work). Caselle \textit{et al.} do
+ not incorporate the essential singularity.
} \label{fig:glow.radius}
\end{figure}