From 9e3299497422b685e4b14d21c308301c6086060a Mon Sep 17 00:00:00 2001 From: Shahed Sharif Date: Wed, 11 Dec 2019 23:47:48 -0800 Subject: [PATCH] Fixed small typo. --- ConstantInvariant.tex | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) diff --git a/ConstantInvariant.tex b/ConstantInvariant.tex index 9fd7f7b..0ea4157 100644 --- a/ConstantInvariant.tex +++ b/ConstantInvariant.tex @@ -872,7 +872,7 @@ \section{Proof of Theorem~\ref{thm:curves-dense}} Suppose $g \in \Z_{\ge 1}$, $\ell$ is a prime number not equal to the characteristic of the base ring $R$, and $f$ an $R$-valued Siegel modular form on $\ag$. %Let $\infty \in X_0(N)$ be the unique cusp with type $I_1$ reduction. - Then there is a function $c : \sD to R$ such that for all % but finitely many + Then there is a function $c : \sD \to R$ such that for all % but finitely many $A \in \detl$, the $q$-expansion of %the modular form $\psimod^*(f)$ at $\infty$ is