X-Git-Url: https://git.ucc.asn.au/?p=ipdf%2Fsam.git;a=blobdiff_plain;f=chapters%2FProgress.tex;fp=chapters%2FProgress.tex;h=5727c2a2864fa9c1a5f37e43e7e6ec179b31da62;hp=475bc07ef5b82d411843d54165fedec4a573a81d;hb=1e1740165abac91f4f620ef8223a30e37e7124ab;hpb=df1e38d148d992b7caf24932ae89cf5cd610d5b8

diff --git a/chapters/Progress.tex b/chapters/Progress.tex
index 475bc07..5727c2a 100644
--- a/chapters/Progress.tex
+++ b/chapters/Progress.tex
@@ -28,6 +28,9 @@ The literature examined in Chapter\ref{Background} can broadly classed into thre
 To improve the Literature Review we could consider the following topics in more detail:
 \begin{enumerate}
 	\item Additional approaches to arbitrary precision possibly including symbolic computation
+	\begin{itemize}
+		\item The Mathematica computational package claims to use symbolic computation, but we have yet to explore this field
+	\end{itemize}
 	\item Floating point errors in the context of computing B\'{e}zier Curves or similar
 	\item Algorithms for reducing overall error other than Fast2Sum
 	\item Alternative number representations such as rationals (eg: $\frac{1}{3}$)