\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 \item[{$\alpha$}] maps $\calA^u\to \calA^v$ or $\calA^u\to \calA^w$ \hfill\ \ref{subsubsec:RelWithu} % \beta % \gamma % \delta \item[{$\Delta$}] cloning, co-product\hfill\ \ref{par:Delta} \item[{$\delta$}] Satoh's tube map\hfill\ \ref{subsubsec:TopTube} \item[{$\delta_A$}] a formal $D_A$\hfill\ \ref{subsec:AlexanderProof} % \epsilon % \zeta % \eta % \theta \item[{$\theta$}] inversion, antipode\hfill\ \ref{par:theta} % \iota \item[{$\iota$}] an inclusion $\wB_n\to\wB_{n+1}$\hfill\ \ref{subsubsec:McCool} \item[{$\iota$}] interpretation map\hfill\ \ref{subsec:AlexanderProof}, \ref{subsubsec:IAM} % \kappa % \lambda \item[{$\lambda$}] a formal $EZ$\hfill\ \ref{subsec:AlexanderProof} % \mu % \nu % \xi \item[{$\xi_i$}] the generators of $F_n$\hfill\ \ref{subsubsec:McCool} % \omicron % \pi % \rho % \sigma \item[{$\Sigma$}] a virtual surface\hfill\ \ref{subsubsec:TopTube} \item[{$\sigma_i$}] a crossing between adjacent strands\hfill\ \ref{subsubsec:Planar} \item[{$\sigma_{ij}$}] strand $i$ crosses over strand $j$\hfill\ \ref{subsubsec:Abstract} \item[{$\varsigma$}] the skeleton morphism\hfill\ \ref{subsubsec:Planar} % \tau % \upsilon % \phi \item[{$(\varphi^i)$}] a basis of $\frakg^\ast$\hfill\ \ref{subsec:LieAlgebras} % \chi % \psi % \omega \item[{$\omega_1$}] a formal 1-wheel\hfill\ \ref{subsec:AlexanderProof} \item %a \item[{$\calA(G)$}] associated graded of $G$\hfill\ \ref{subsubsec:FTAlgebraic} \item[{$\calA^-_n$}] $\calD^v_n$ mod relations\hfill\ \ref{subsubsec:FTPictorial} \item[{$\calA^{-t}$}] $\calA^-$ allowing trivalent vertices\hfill\ \ref{subsec:Jacobi} \item[{$\calA^-(\uparrow)$}] $\calD^v(\uparrow)$ mod relations\hfill\ \ref{subsec:FTforvwKnots} \item[{$\calA^-(\bigcirc)$}] $\calA^-(\uparrow)$ for round skeletons\hfill\ \ref{subsec:SomeDimensions} \item[{$\calA^u$}] usual chord diagrams\hfill\ \ref{subsec:RelWithKont} \item[{$A(K)$}] the Alexander polynomial\hfill\ \ref{subsec:Alexander} \item[{$\aAS$}] arrow-AS relations\hfill\ \ref{subsec:Jacobi} \item[{$a$}] maps $u\to v$ or $u\to w$\hfill\ \ref{subsubsec:RelWithu} \item[{$a_{ij}$}] an arrow from $i$ to $j$\hfill\ \ref{subsubsec:FTPictorial} %b \item[{$\calB^w$}] unitrivalent arrow diagrams\hfill\ \ref{subsec:Jacobi} \item[{$B$}] the matrix $T(\exp(-xS)-I)$\hfill\ \ref{subsec:AlexanderProof} \item[{$b_{ij}^k$}] structure constants of $\frakg^\ast$\hfill\ \ref{subsec:LieAlgebras} %c \item[{CC}] the Commutators Commute relation\hfill\ \ref{subsec:Jacobi} %d \item[{$\calD^v_n$}] arrow diagrams for braids\hfill\ \ref{subsubsec:FTPictorial} \item[{$\calD^{-t}$}] $\calD^-$ allowing trivalent vertices\hfill\ \ref{subsec:Jacobi} \item[{$\calD^v(\uparrow)$}] arrow diagrams long knots\hfill\ \ref{subsec:FTforvwKnots} \item[{$D_A$}] either $D_L$ or $D_R$\hfill\ \ref{subsec:Jacobi} \item[{$D_L$}] left-going isolated arrow\hfill\ \ref{subsec:Jacobi} \item[{$D_R$}] right-going isolated arrow\hfill\ \ref{subsec:Jacobi} \item[{$d_k$}] strand deletion\hfill\ \ref{par:deletions} \item[{$d_i$}] the direction of a crossing\hfill\ \ref{subsec:Alexander} %e \item[{$E$}] the Euler operator\hfill\ \ref{subsec:AlexanderProof} \item[{$\tilE$}] the normalized Euler operator\hfill\ \ref{subsec:AlexanderProof} %f \item[{FI}] Framing Independence\hfill\ \ref{subsec:SomeDimensions} \item[{$F_n$}] the free group\hfill\ \ref{subsubsec:McCool} \item[{$\FA_n$}] the free associative algebra\hfill\ \ref{par:action} %g \item[{$\frakg$}] a finite-dimensional Lie algebra\hfill\ \ref{subsec:LieAlgebras} \item[{$\calG_m$}] degree $m$ piece\hfill\ \ref{subsubsec:FTPictorial} %h %i \item[{$\calI$}] augmentation ideal\hfill\ \ref{subsubsec:FTAlgebraic}, \item[{$I\frakg$}] $\frakg^\ast\rtimes\frakg$\hfill\ \ref{subsec:LieAlgebras} \item[{$\IAM$}] Infinitesimal Alexander\newline Module\hfill\ \ref{subsec:AlexanderProof}, \ref{subsubsec:IAM} \item[{$\IAM^0$}] $\IAM$, before relations\hfill\ \ref{subsubsec:IAM} \item[{$\aIHX$}] arrow-IHX relations\hfill\ \ref{subsec:Jacobi} \item[{$i_u$}] an inclusion $F_n\to\wB_{n+1}$\hfill\ \ref{subsubsec:McCool} %j %k \item[{$\calK^u$}] usual knots\hfill\ \ref{subsec:RelWithKont} %l %m \item[{M}] the ``mixed'' move\hfill\ \ref{subsec:VirtualKnots} %n %o \item[{OC}] the Overcrossings Commute relation\hfill\ \ref{subsec:wBraids} %p \item[{$\calP^-(\uparrow)$}] primitives of $\calA^-(\uparrow)$\hfill\ \ref{subsec:FTforvwKnots} \item[{$\PvB_n$}] the group of pure v-braids\hfill\ \ref{subsubsec:Planar} \item[{$\PwB_n$}] the group of pure w-braids\hfill\ \ref{subsec:wBraids} %q %r \item[{$\calR$}] the relations in $\IAM$\hfill\ \ref{subsubsec:IAM} \item[{$R$}] $Z(\overcrossing)$\hfill\ \ref{subsec:wBraidExpansion} \item[{$R$}] the ring $\bbZ[X,X^{-1}]$\hfill\ \ref{subsubsec:IAM} \item[{$R_1$}] the augmentation ideal of $R$\hfill\ \ref{subsubsec:IAM} \item[{RI}] Rotation number Independence\hfill\ \ref{subsec:FTforvwKnots} \item[{R123}] Reidemeister moves\hfill\ \ref{subsec:VirtualKnots} %\item[{R4}] a Reidemeister move for foams/graphs\hfill\ \ref{subsubsec:wrels} \item[{\Rs}] the ``spun'' R1 move\hfill\ \ref{subsec:VirtualKnots} %s \item[{$S(K)$}] a matrix of signs\hfill\ \ref{subsec:Alexander} \item[{$S_n$}] the symmetric group\hfill\ \ref{subsubsec:Planar} \item[{$\aSTU$}] arrow-STU relations\hfill\ \ref{subsec:Jacobi} \item[{$s_i$}] a virtual crossing between adjacent strands\hfill\ \ref{subsubsec:Planar} \item[{$s_i$}] the sign of a crossing\hfill\ \ref{subsec:Alexander} \item[{$\sl$}] self-linking\hfill\ \ref{subsec:VirtualKnots} %t \item[{$\calT^w_\frakg$}] a map ${\calA}^w\to\calU(I\frakg)$\hfill\ \ref{subsec:LieAlgebras} \item[{TC}] Tails Commute\hfill\ \ref{subsubsec:FTPictorial} \item[{$T(K)$}] the ``trapping'' matrix\hfill\ \ref{subsec:Alexander} %u \item[{$\calU$}] universal enveloping algebra\hfill\ \ref{subsec:LieAlgebras} \item[{UC}] Undercrossings Commute\hfill\ \ref{subsec:wBraids} \item[{$u_k$}] strand unzips\hfill\ \ref{par:unzip} \item[{$\uB_n$}] the (usual) braid group\hfill\ \ref{subsubsec:Planar} %v \item[{$V$}] a finite-type invariant\hfill\ \ref{subsubsec:FTPictorial} \item[{VR123}] virtual Reidemeister moves\hfill\ \ref{subsec:VirtualKnots} \item[{$\vB_n$}] the virtual braid group\hfill\ \ref{subsubsec:Planar} %w \item[{$W_m$}] weight system\hfill\ \ref{subsubsec:FTPictorial} \item[{$w$}] the map $x^k\mapsto w_k$\hfill\ \ref{subsec:Alexander} \item[{$w_i$}] flip ring $\#i$\hfill\ \ref{subsubsec:FlyingRings} \item[{$w_k$}] the $k$-wheel\hfill\ \ref{subsec:Jacobi} \item[{$\wB_n$}] the group of w-braids\hfill\ \ref{subsec:wBraids} %x \item[{$X$}] an indeterminate\hfill\ \ref{subsec:Alexander} \item[{$X_n,\, \tilde{X}_n$}] moduli of horizontal rings\hfill\ \ref{subsubsec:FlyingRings} \item[{$x_i$}] the generators of $FA_n$\hfill\ \ref{par:action} \item[{$(x_j)$}] a basis of $\frakg$\hfill\ \ref{subsec:LieAlgebras} %y \item[{$Y_n,\, \tilde{Y}_n$}] moduli of rings\hfill\ \ref{subsubsec:NonHorRings} %z \item[{$Z$}] expansions \hfill\ throughout \item[{$Z^u$}] the Kontsevich integral\hfill\ \ref{subsec:RelWithKont} \item \item[{$\aft$}] $\aft$ relations\hfill\ \ref{subsubsec:FTPictorial} \item[{$6T$}] $6T$ relations\hfill\ \ref{subsubsec:FTPictorial} \item[{$\semivirtualover,\,\semivirtualunder$}] semi-virtual crossings\hfill\ \ref{subsubsec:FTPictorial} \item[{$\sslash$}] right action\hfill\ \ref{subsubsec:McCool} \item[{$\uparrow$}] a ``long'' strand\hfill\ throughout \end{list} \end{multicols}}