\draftcut \section{Glossary of notation} \label{sec:glossary} Greek letters, then Latin, then symbols: \noindent {\small \begin{multicols}{2} \begin{list}{}{ \renewcommand{\makelabel}[1]{#1\hfil} } % \alpha % \beta % \gamma % \delta \item[{$\delta$}] Satoh's tube map\hfill\ \ref{subsec:TangleTopology} \item[{$\Delta$}] co-product\hfill\ \ref{subsec:ATSpaces} %\item[{$\Delta$}] cloning\hfill\ \ref{subsec:Quandles} % \epsilon % \zeta % \eta % \theta % \iota \item[{$\iota$}] inclusion $\attr_n\to\calP^w(\uparrow_n)$\hfill\ \ref{subsec:ATSpaces} % \kappa % \lambda % \mu % \nu \item[{$\nu$}] the invariant of the unknot\hfill\ \ref{subsec:KTG} % \xi % \omicron % \pi \item[{$\pi$}] the projection $\calP^w(\uparrow_n)\to\fraka_n\oplus\tder_n$ \hfill\ \ref{subsec:ATSpaces} % \rho % \sigma % \tau % \upsilon % \phi \item[{$\phi$}] log of an associator\hfill\ \ref{subsec:KTG} \item[{$\Phi$}] an associator\hfill\ \ref{subsec:KTG} % \chi % \psi \item[{$\psi_\beta$}] ``operations''\hfill\ \ref{subsec:AlgebraicStructures} % \omega \item %a \item[{$\fraka_n$}] $n$-dimensional Abelian Lie algebra\hfill\ \ref{subsec:ATSpaces} \item[{$\calA$}] a candidate associated graded structure\hfill\ \ref{subsec:Expansions} \item[{$\calA^{sv}$}] $\calD^v$ mod 6T, RI\hfill\ \ref{subsec:vw-tangles} \item[{$\calA^{sw}$}] $\calD^w$ mod $\aft$, TC, RI\hfill\ \ref{subsec:vw-tangles} \item[{$\calA^{sw}$}] $\grad\wTFo$\hfill\ \ref{subsec:fgrad} \item[{$\calA^{sw}$}] $\grad\wTF$\hfill\ \ref{subsubsec:AwWen} \item[{$\calA^{(s)w}$}] $\calA^{w}$ and/or $\calA^{sw}$\hfill\ \ref{subsec:fgrad} \item[{$\calA^u$}] chord diagrams mod rels for KTGs\hfill\ \ref{subsec:KTG} \item[{$\calA^v$}] $\calD^v$ mod 6T\hfill\ \ref{subsec:vw-tangles} \item[{$\calA^w$}] $\calD^w$ mod $\aft$, TC\hfill\ \ref{subsec:vw-tangles} \item[{$\calA^w$}] $\grad\wTFo$ without RI\hfill\ \ref{subsec:fgrad} \item[{$\calA^-(\uparrow_n)$}] $\calA^-$ for pure $n$-tangles\hfill\ \ref{subsec:ATSpaces} \item[{$A_e$}] 1D orientation reversal\hfill\ \ref{subsubsec:wops} \item[{$\Ass$}] associative words\hfill\ \ref{subsec:ATSpaces} \item[{$\Ass^+$}] non-empty associative words\hfill\ \ref{subsec:ATSpaces} %b \item[{$\calB^w_n$}] $n$-coloured unitrivalent arrow \newline diagrams\hfill\ \ref{subsec:ATSpaces} %c \item[{$C$}] the invariant of a cap\hfill\ \ref{subsec:wTFExpansion} \item[{CP}] the Cap-Pull relation\hfill\ \ref{subsubsec:wrels}, \ref{subsec:fgrad} \item[{CW}] Cap-Wen relations\hfill\ \ref{subsubsec:WenRels} \item[{$c$}] a chord in $\calA^u$\hfill\ \ref{subsec:KTG} %d \item[{$\der$}] Lie-algebra derivations\hfill\ \ref{subsec:ATSpaces} \item[{$\calD^v$, $\calD^w$}] arrow diagrams for v/w-tangles\hfill\ \ref{subsec:vw-tangles} \item[{$\divop$}] the ``divergence''\hfill\ \ref{subsec:ATSpaces} %e %f \item[{$F$}] a map $\calA^w\to\calA^w$\hfill\ \ref{subsec:fgrad} \item[{$F$}] the main~\cite{AlekseevTorossian:KashiwaraVergne} unknown \hfill\ \ref{subsec:EqWithAT} \item[{FR}] Flip Relations\hfill\ \ref{subsubsec:WenRels}, \ref{subsubsec:AwWen} \item[{$\fil$}] a filtered structure\hfill\ \ref{subsec:Expansions} %g %h %i \item[{$\calI$}] augmentation ideal\hfill\ \ref{subsec:Grad} %j \item[{$J$}] a map $\TAut_n\to\exp(\attr_n)$\hfill\ \ref{subsec:ATSpaces} \item[{$j$}] a map $\TAut_n\to\attr_n$\hfill\ \ref{subsec:ATSpaces} %k \item[{KTG}] Knotted Trivalent Graphs\hfill\ \ref{subsec:KTG} %l \item[{$\lie_n$}] free Lie algebra\hfill\ \ref{subsec:ATSpaces} \item[{$l$}] a map $\tder_n\to\calP^w(\uparrow_n)$\hfill\ \ref{subsec:ATSpaces} %m %n %o \item[{$\calO$}] an ``algebraic structure''\hfill\ \ref{subsec:AlgebraicStructures} %p \item[{$\calP^w_n$}] primitives of $\calB^w_n$\hfill\ \ref{subsec:ATSpaces} \item[{$\calP^-(\uparrow_n)$}] primitives of $\calA^-(\uparrow_n)$\hfill\ \ref{subsec:ATSpaces} \item[{$\grad$}] associated graded structure \hfill\ \ref{subsec:Grad} %q %r \item[{$R$}] the invariant of a crossing\hfill\ \ref{subsec:wTFExpansion} \item[{R4}] a Reidemeister move for \newline foams/graphs\hfill\ \ref{subsubsec:wrels} %s \item[{$\sder$}] special derivations\hfill\ \ref{subsec:sder} \item[{$\calS$}] the circuit algebra of skeletons\hfill\ \ref{subsec:CircuitAlgebras} \item[{$\SAut_n$}] the group $\exp(\sder_n)$\hfill\ \ref{subsec:KTG} \item[{$S_k$}] complete orientation reversal\hfill\ \ref{subsec:UniquenessForTangles} \item[{$S_e$}] complete orientation reversal\hfill\ \ref{subsubsec:wops} \item[{$\sKTG$}] signed long KTGs\hfill\ \ref{subsec:KTG} %t \item[{TV}] Twisted Vertex relations\hfill\ \ref{subsubsec:WenRels} \item[{$\tder$}] tangential derivations\hfill\ \ref{subsec:ATSpaces} \item[{$\attr_n$}] cyclic words\hfill\ \ref{subsec:ATSpaces} \item[{$\attr^s_n$}] cyclic words mod degree 1\hfill\ \ref{subsec:ATSpaces} \item[{$\TAut_n$}] the group $\exp(\tder_n)$\hfill\ \ref{subsec:ATSpaces} %u \item[{$u$}] a map $\tder_n\to\calP^w(\uparrow_n)$\hfill\ \ref{subsec:ATSpaces} \item[{$u_e$}] strand unzips\hfill\ \ref{subsubsec:wops} \item[{$\uT$}] u-tangles\hfill\ \ref{subsec:sder} %v \item[{$V$, $V^+$}] the invariant of a (positive) vertex\hfill\ \ref{subsec:wTFExpansion} \item[{$V^-$}] the invariant of a negative vertex\hfill\ \ref{subsec:wTFExpansion} \item[{VI}] Vertex Invariance\hfill\ \ref{subsec:fgrad} \item[{$\vT$}] v-tangles\hfill\ \ref{subsec:vw-tangles} %\item[{$\vT(\uparrow_n)$}] pure $n$-component v-tangles\hfill\ % \ref{subsec:ATSpaces} %w \item[{$W$}] $Z(w)$\hfill\ \ref{subsubsec:ZwithWen} \item[{$W^2$}] Wen squared\hfill\ \ref{subsubsec:WenRels} \item[{$w$}] the wen\hfill\ \ref{subsec:TheWen} \item[{$\wT$}] w-tangles\hfill\ \ref{subsec:vw-tangles} %\item[{$\wT(\uparrow_n)$}] pure $n$-component w-tangles\hfill\ % \ref{subsec:ATSpaces} \item[{$\wTF$}] w-tangled foams with wens\hfill\ \ref{subsec:TheWen} \item[{$\wTFo$}] orientable w-tangled foams\hfill\ \ref{subsec:wTFo} %x %y %z \item[{$Z$}] expansions \hfill\ throughout \item[{$Z_\calA$}] an $\calA$-expansion\hfill\ \ref{subsec:Expansions} \item \item[{4T}] $4T$ relations\hfill\ \ref{subsec:KTG} \item[{$\uparrow$}] a ``long'' strand\hfill\ throughout \item[{$\up$}] the quandle operation\hfill\ \ref{subsec:AlgebraicStructures} %\ref{subsec:Quandles} %\item[{$\up_2$}] doubled $\up$\hfill\ \ref{subsec:Quandles} \item[{$*$}] the adjoint on $\calA^w(\uparrow_n)$\hfill\ \ref{subsec:ATSpaces} \end{list} \end{multicols}}