feat: technical note papers improvements. (papers).

Signed-off-by: Amlal El Mahrouss <amlal@nekernel.org>

1 files changed, 2 insertions, 2 deletions

diff --git a/source/dn001.07/paper.tex b/source/dn001.07/paper.tex
index 84a8e87..d06db8b 100644
--- a/source/dn001.07/paper.tex
+++ b/source/dn001.07/paper.tex
@@ -39,9 +39,9 @@ For $\alpha \in \mathbb{R}$.
 \subsubsection{Conditions of $\beta$}
 
 Let $\beta$ be an integral of $t \in \mathbb{Z}$ which consists of $\alpha \in \mathbb{R}$.
-$\beta > \alpha$. Such that $\lim_{t \to e} (\alpha \to \infty$).
+$\beta > \alpha$. Such that $\lim_{t \to e} (\alpha \to \infty$+).
 
 \subsubsection{Conclusion}
-We see that $\beta, \quad \alpha$ is defined if and only if $t > e$. We can conclude that the lemma holds and points toward $\infty$.
+We see that $\beta, \quad \alpha$ is defined if and only if $t > e$. We can conclude that the lemma holds and points toward $\infty+$.
 
 \end{document}