Done with IIA and IIB

Manuscript/EPAWTFT.tex

@@ -202,6 +202,8 @@ Critical points are singularities which lie on the real axis and where the natur
 However, these do not clearly belong to a given class of singularities and they cannot be rigorously classified as they have more complicated functional forms.
 }
 
+\titou{T2: I THINK THAT IN GENERAL THE AXE LABELS ARE TOO SMALL.}
+
 %%%%%%%%%%%%%%%%%%%%%%%
 \section{Exceptional Points in Electronic Structure}
 \label{sec:EPs}
@@ -239,7 +241,7 @@ However, exact solutions to Eq.~\eqref{eq:SchrEq} are only possible in the simpl
 the one-electron hydrogen atom and some specific two-electron systems with well-defined mathematical 
 properties.\cite{Taut_1993,Loos_2009b,Loos_2010e,Loos_2012}
 In practice, approximations to the exact Schr\"{o}dinger equation must be introduced, including
-the perturbation theories and Hartree--Fock approximation considered in this review
+perturbation theories and Hartree--Fock approximation considered in this review.
 In what follows, we will drop the parametric dependence on the nuclear geometry and, 
 unless otherwise stated, atomic units will be used throughout.