Merge pull request #20 from ladanielson/fixtypos

fixed quotation marks

ldanielson.tex

@@ -3,7 +3,7 @@
 $M$ of type Sol in terms of the glueing homeomorphism for the bundle.
 
 One can reformulate the previous theorem stating that
-$\sum_{n>0}\Lk(\partial C_n,c) q^n$ is a "mixed Mock modular form"
+$\sum_{n>0}\Lk(\partial C_n,c) q^n$ is a ``mixed Mock modular form''
 of weight $2$; it is the product of a Mock modular form of weight
 $3/2$ with a unary theta series. Such forms, which originate with
 the famous Ramanujan Mock theta functions, have recently generated
@@ -18,12 +18,6 @@
 
 
 
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 \subsubsection*{Relation to the work of Hirzebruch and Zagier}
 
 In their seminal paper \cite{HZ}, Hirzebruch-Zagier provided a map
@@ -53,7 +47,7 @@ \subsubsection*{Relation to the work of Hirzebruch and Zagier}
 $T_n^c \cdot T_m = (T_n \cdot T_m)_X  + ({T}_n \cdot {T}_m)_{\infty}$,
 where $(T_n \cdot T_m)_X $ is the geometric intersection number of
 $T_n$ and $T_m$ in the interior of $X$ and $({T}_n \cdot {T}_m)_{\infty}$
-which they called the "contribution from infinity". They then proved
+which they called the ``contribution from infinity''. They then proved
 both generating functions $\sum_{n=0}^{\infty} (T_n \cdot T_m)_X
 q^n$ and $\sum_{n=0}^{\infty}  (T_n \cdot T_m)_{\infty} q^n$ are
 the holomorphic parts of two non-holomorphic forms $F_X$ and