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authorJaron Kent-Dobias <jaron@kent-dobias.com>2021-10-27 15:12:57 +0200
committerJaron Kent-Dobias <jaron@kent-dobias.com>2021-10-27 15:12:57 +0200
commit3ca1881c36580a844c7cae826fb694118ef48e03 (patch)
treedeee0ca60442f31688ed91dc24107c04a4bfacbd
parent759784b74bec9830d64a862b4d371227534bbf3b (diff)
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Incorporated most of Jim's comments.
-rw-r--r--ising_scaling.bib43
-rw-r--r--ising_scaling.tex51
2 files changed, 64 insertions, 30 deletions
diff --git a/ising_scaling.bib b/ising_scaling.bib
index d067bef..a971fbd 100644
--- a/ising_scaling.bib
+++ b/ising_scaling.bib
@@ -29,9 +29,9 @@
@article{Campostrini_2000_Critical,
author = {Campostrini, Massimo and Pelissetto, Andrea and Rossi, Paolo and Vicari, Ettore},
- title = {Critical equation of state of three-dimensional $XY$ systems},
+ title = {Critical equation of state of three-dimensional {$XY$} systems},
journal = {Physical Review B},
- publisher = {American Physical Society (APS)},
+ publisher = {American Physical Society ({APS})},
year = {2000},
month = {9},
number = {9},
@@ -259,6 +259,20 @@
doi = {10.1103/physreve.81.060103}
}
+@article{Onsager_1944_Crystal,
+ author = {Onsager, Lars},
+ title = {Crystal Statistics. {I}. A Two-Dimensional Model with an Order-Disorder Transition},
+ journal = {Physical Review},
+ publisher = {American Physical Society (APS)},
+ year = {1944},
+ month = {2},
+ number = {3-4},
+ volume = {65},
+ pages = {117--149},
+ url = {https://doi.org/10.1103%2Fphysrev.65.117},
+ doi = {10.1103/physrev.65.117}
+}
+
@article{Raju_2019_Normal,
author = {Raju, Archishman and Clement, Colin B. and Hayden, Lorien X. and Kent-Dobias, Jaron P. and Liarte, Danilo B. and Rocklin, D. Zeb and Sethna, James P.},
title = {Normal Form for Renormalization Groups},
@@ -273,6 +287,31 @@
doi = {10.1103/physrevx.9.021014}
}
+@article{Schofield_1969_Parametric,
+ author = {Schofield, P.},
+ title = {Parametric Representation of the Equation of State Near A Critical Point},
+ journal = {Physical Review Letters},
+ publisher = {American Physical Society (APS)},
+ year = {1969},
+ month = {3},
+ number = {12},
+ volume = {22},
+ pages = {606--608},
+ url = {https://doi.org/10.1103%2Fphysrevlett.22.606},
+ doi = {10.1103/physrevlett.22.606}
+}
+
+@article{Voloshin_1985_Decay,
+ author = {Voloshin, M. B.},
+ title = {Decay of false vacuum in ($1+1$) dimensions},
+ journal = {Soviet Journal of Nuclear Physics},
+ year = {1985},
+ month = {10},
+ number = {4},
+ volume = {42},
+ pages = {644--649}
+}
+
@article{Yang_1952_Statistical,
author = {Yang, C. N. and Lee, T. D.},
title = {Statistical Theory of Equations of State and Phase Transitions. {I}: Theory of Condensation},
diff --git a/ising_scaling.tex b/ising_scaling.tex
index 5fc476d..2055b9b 100644
--- a/ising_scaling.tex
+++ b/ising_scaling.tex
@@ -55,7 +55,7 @@ universality class.
The continuous phase transition in the two-dimensional Ising model is the most
well studied, and its universal thermodynamic functions have likewise received
-the most attention. Precision numeric work both on lattice models and on the
+the most attention. Without a field, an exact solution is known for some lattice models \cite{Onsager_1944_Crystal}. Precision numeric work both on lattice models and on the
``Ising'' conformal field theory (related by universality) have yielded
high-order polynomial expansions of those functions, along with a comprehensive
understanding of their analytic properties \cite{Fonseca_2003_Ising,
@@ -63,15 +63,15 @@ Mangazeev_2008_Variational, Mangazeev_2010_Scaling}. In parallel, smooth
approximations of the Ising equation of state produce convenient, evaluable,
differentiable empirical functions \cite{Caselle_2001_The}. Despite being
differentiable, these approximations become increasingly poor when derivatives
-are taken due to the absence of subtle singularities.
+are taken due to the neglect of subtle singularities.
This paper attempts to find the best of both worlds: a smooth approximate
-universal thermodynamic function that respects the global analyticity of the
+universal thermodynamic function that respects the global analytic properties of the
Ising free energy. By constructing approximate functions with the correct
singularities, corrections converge exponentially to the true function. To make
the construction, we review the analytic properties of the Ising scaling
function. Parametric coordinates are introduced that remove unnecessary
-singularities that are a remnant of the coordinates. Then, the arbitrary
+singularities that are a remnant of the coordinate choice. The singularities known to be present in the scaling function are incorporated in their simplest form. Then, the arbitrary
analytic functions that compose those coordinates are approximated by truncated
polynomials whose coefficients are fixed by matching the series expansions of
the universal function.
@@ -87,11 +87,11 @@ universal.
Suppose one controls a temperature-like parameter $T$ and a magnetic field-like
parameter $H$, which in the proximity of a critical point at $T=T_c$ and $H=0$
have normalized reduced forms $t=(T-T_c)/T_c$ and $h=H/T$. Thermodynamic
-functions are derived from the free energy per site $f=(F-F_c)/L^D$, which
+functions are derived from the free energy per site $f=(F-F_c)/N$, which
depends on $t$, $h$, and a litany of irrelevant parameters we will henceforth
neglect. Explicit renormalization with techniques like the
$\epsilon$-expansion or exact solutions like Onsager's can be used calculated
-the flow of these parameters under continuous changes of scale $L=e^\ell$,
+the flow of these parameters under continuous changes of scale $e^\ell$,
yielding equations of the form
\begin{align} \label{eq:raw.flow}
\frac{dt}{d\ell}=\frac1\nu t+\cdots
@@ -118,13 +118,10 @@ the flow equations into the agreed upon simplest normal form
which are exact as written \cite{Raju_2019_Normal}. The flow of the
\emph{scaling fields} $u_t$ and $u_h$ is made exactly linear, while that of the
free energy is linearized as nearly as possible. The quadratic term in that
-equation is unremovable due to a resonance between the value of $\nu$ and the
+equation is unremovable due to a `resonance' between the value of $\nu$ and the
spatial dimension in two dimensions, while its coefficient is chosen as a
matter of convention, fixing the scale of $u_t$. The form $u_f$ of the free
-energy is known as the singular part of the free energy, since it is equivalent
-to subtracting an analytic function of the control variables from the free
-energy, breaking it into pieces that scale homogeneously and inhomogeneously with
-renormalization.
+energy is known as the singular part of the free energy.
Solving these equations for $u_f$ yields
\begin{equation}
@@ -134,11 +131,13 @@ Solving these equations for $u_f$ yields
&=|u_h|^{D\nu/\Delta}\mathcal F_0(u_t|u_h|^{-1/\Delta})+\frac{|u_t|^{D\nu}}{8\pi}\log u_h^{2/\Delta} \\
\end{aligned}
\end{equation}
-where $\mathcal F_\pm$ and $\mathcal F_0$ are undetermined scaling functions.
+where $\mathcal F_\pm$ and $\mathcal F_0$ are undetermined scaling functions related by a change of coordinates \footnote{To connect the
+results of this paper with Mangazeev and Fonseca, one can write $\mathcal
+F_0(\eta)=\tilde\Phi(-\eta)=\Phi(-\eta)+(\eta^2/8\pi) \log \eta^2$ and
+$\mathcal F_\pm(\xi)=G_{\mathrm{high}/\mathrm{low}}(\xi)$.}.
The scaling functions are universal in the sense that if another system whose
critical point belongs to the same universality class has its parameters
-brought to the form \eqref{eq:flow}, one will see the same functional form (up
-to constant rescaling of $u_h$). The invariant scaling combinations that appear
+brought to the form \eqref{eq:flow}, one will see the same functional form, up to the units of $u_t$ and $u_h$. The invariant scaling combinations that appear
as the arguments to the universal scaling functions will come up often, and we
will use $\xi=u_h|u_t|^{-\Delta}$ and $\eta=u_t|u_h|^{-1/\Delta}$.
@@ -162,10 +161,7 @@ For the scale of $u_t$ and $u_h$, we adopt the same convention as used by
\cite{Fonseca_2003_Ising}. The dependence of the nonlinear scaling variables on
the parameters $t$ and $h$ is system-dependent, and their form can be found for
common model systems (the square- and triangular-lattice Ising models) in the
-literature \cite{Mangazeev_2010_Scaling, Clement_2019_Respect}. To connect the
-results of this paper with Mangazeev and Fonseca, one can write $\mathcal
-F_0(\eta)=\tilde\Phi(-\eta)=\Phi(-\eta)+(\eta^2/8\pi) \log \eta^2$ and
-$\mathcal F_\pm(\xi)=G_{\mathrm{high}/\mathrm{low}}(\xi)$.
+literature \cite{Mangazeev_2010_Scaling, Clement_2019_Respect}.
\section{Singularities}
@@ -193,8 +189,8 @@ This critical bubble occurs with free energy cost
\simeq\frac{\pi\sigma^2}{2M|H|}
\simeq T\left(\frac{2M_0}{\pi\sigma_0^2}|\xi|\right)^{-1}
\end{equation}
-where $\sigma_0$ and $M_0$ are the critical amplitudes for the surface tension
-and magnetization, respectively \cite{Kent-Dobias_2020_Novel}. In the context
+where $\sigma_0=\lim_{t\to0}t^{-\mu}\sigma$ and $M_0=\lim_{t\to0}t^{-\beta}M$ are the critical amplitudes for the surface tension
+and magnetization at zero field in the low-temperature phase \cite{Kent-Dobias_2020_Novel}. In the context
of statistical mechanics, Langer demonstrated that the decay rate is
asymptotically proportional to the imaginary part of the free energy in the
metastable phase, with
@@ -202,9 +198,9 @@ metastable phase, with
\operatorname{Im}F\propto\Gamma\sim e^{-\beta\Delta F_c}\simeq e^{-1/b|\xi|}
\end{equation}
which can be more rigorously related in the context of quantum field theory
-[ref?]. The constant $b=2M_0/\pi\sigma_0^2$ is predicted by known properties,
-and for our conventions for $u_t$ and $u_h$, $M_0/\sigma_0^2=\bar
-s=2^{1/12}e^{-1/8}A^{3/2}$, where $A$ is Glaisher's constant.
+\cite{Voloshin_1985_Decay}. The constant $b=2M_0/\pi\sigma_0^2$ is predicted by known properties, e.g., for the square lattice $M_0$ and $\sigma_0$ are both predicted by Onsager's solution \cite{Onsager_1944_Crystal},
+but for our conventions for $u_t$ and $u_h$, $M_0/\sigma_0^2=\bar
+s=2^{1/12}e^{-1/8}A^{3/2}$, where $A$ is Glaisher's constant \cite{Fonseca_2003_Ising}.
\begin{figure}
@@ -220,15 +216,14 @@ s=2^{1/12}e^{-1/8}A^{3/2}$, where $A$ is Glaisher's constant.
To lowest order, this singularity is a function of the scaling invariant $\xi$
alone. It is therefore suggestive that this should be considered a part of the
singular free energy and moreover part of the scaling function that composes
-it. There is substantial numeric evidence for this as well. We will therefore
+it. There is substantial numeric evidence for this as well \cite{Enting_1980_An, Fonseca_2003_Ising}. We will therefore
make the ansatz that
\begin{equation} \label{eq:essential.singularity}
\operatorname{Im}\mathcal F_-(\xi+i0)=A_0\Theta(-\xi)\xi e^{-1/b|\xi|}\left[1+O(\xi)\right]
\end{equation}
-\cite{Houghton_1980_The}
The linear prefactor can be found through a more careful accounting of the
entropy of long-wavelength fluctuations in the droplet surface
-\cite{Gunther_1980_Goldstone}. In conformal field theory, the prefactor is also known to be $A_0=\bar s/2\pi$.
+\cite{Gunther_1980_Goldstone, Houghton_1980_The}. In the Ising conformal field theory, the prefactor is known to be $A_0=\bar s/2\pi$ \cite{Voloshin_1985_Decay, Fonseca_2003_Ising}.
\subsection{Yang--Lee edge singularity}
@@ -257,7 +252,7 @@ $\xi_{\mathrm{YL}}$.
} \label{fig:higher.singularities}
\end{figure}
-The Yang--Lee singularities are critical points in their own right, with their
+The Yang--Lee singularities, although only accessible with complex fields, are critical points in their own right, with their
own universality class different from that of the Ising model
\cite{Fisher_1978_Yang-Lee}. Asymptotically close to this point, the scaling
function $\mathcal F_+$ takes the form
@@ -293,7 +288,7 @@ The Schofield coordinates $R$ and $\theta$ are implicitly defined by
&&
u_h(R, \theta) = R^{\Delta}g(\theta)
\end{align}
-where $g$ is an odd function whose first zero lies at $\theta_0>1$. We take
+where $g$ is an odd function whose first zero lies at $\theta_0>1$ \cite{Schofield_1969_Parametric}. We take
\begin{align} \label{eq:schofield.funcs}
g(\theta)=\left(1-\frac{\theta^2}{\theta_0^2}\right)\sum_{i=0}^\infty g_i\theta^{2i+1}.
\end{align}