From 5460efe5787f6d49e8ce9c38175364f8ac9c9702 Mon Sep 17 00:00:00 2001 From: Jaron Kent-Dobias Date: Tue, 11 Mar 2025 13:29:04 -0300 Subject: Small wording tweak. --- topology.tex | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) diff --git a/topology.tex b/topology.tex index f89a6ca..45f7d75 100644 --- a/topology.tex +++ b/topology.tex @@ -447,7 +447,7 @@ action at the $m=0$ solution, with $\mathcal S(0)=0$. For a generic covariance function $f$ it is not possible to write an explicit formula for $V_\text{\textsc{sat}}$, and we calculate it through a numeric root-finding algorithm.\footnote{ -As a check of this calculation, the satisfiability threshold calculated here can be compared with that calculated using the zero-temperature limit of an equilibrium treatment of the cost function \eqref{eq:cost} made in Ref.~\cite{Urbani_2023_A} for the case where $f(q)=\frac12q^2$ and $\alpha=\frac14$. The authors estimate $V_\text{\textsc{sat}}\simeq1.871$, whereas this manuscript predicts $V_\text{\textsc{sat}}=1.867229\dots$, a seeming inconsistency. However, the author of Ref.~\cite{Urbani_2023_A} indicated in private correspondence that this difference could easily be explained by inaccuracy in the numeric \textsc{pde} treatment of the \textsc{frsb} equilibrium problem. Therefore, this manuscript is consistent with the previous work, but the agreement is not precise. +As a check of this calculation, the satisfiability threshold calculated here can be compared with that calculated using the zero-temperature limit of an equilibrium treatment of the cost function \eqref{eq:cost} made in Ref.~\cite{Urbani_2023_A} for the case where $f(q)=\frac12q^2$ and $\alpha=\frac14$. The authors estimate $V_\text{\textsc{sat}}\simeq1.871$, whereas this manuscript predicts $V_\text{\textsc{sat}}=1.867229\dots$, a seeming inconsistency. However, the author of Ref.~\cite{Urbani_2023_A} indicated in private correspondence that this difference is explained by inaccuracy in the numeric \textsc{pde} treatment of the \textsc{frsb} equilibrium problem. Therefore, this manuscript is consistent with the previous work, but the agreement is not precise. } When $V_0^2