\end{section}
\begin{section}{Euclidean Jordan algebras}
- The Jordan product of $x$ and $y$ in some Euclidean Jordan algebra $V$
- is $\jp{x}{y}$. The Jordan-automorphism group of $V$ is $\JAut{V}$.
+ The Jordan product of $x$ and $y$ in some Euclidean Jordan algebra
+ $V$ is $\jp{x}{y}$. The Jordan-automorphism group of $V$ is
+ $\JAut{V}$. Two popular operators in an EJA are its quadratic
+ representation and ``left multiplication by'' operator. For a
+ given $x$, they are, respectively, $\quadrepr{x}$ and
+ $\leftmult{x}$.
\end{section}
\begin{section}{Font}
% a (bilinear) algebra multiplication in any other context.
\newcommand*{\jp}[2]{{#1} \circ {#2}}
+% The "quadratic representation" of the ambient space applied to its
+% argument. We have standardized on the "P" used by Faraut and Korányi
+% rather than the "U" made popular by Jacobson.
+\newcommand*{\quadrepr}[1]{P_{#1}}
+
+% The "left multiplication by" operator. Takes one argument, the thing
+% to multiply on the left by. This has meaning more generally than in
+% an EJA, but an EJA is where I use it.
+\newcommand*{\leftmult}[1]{L_{#1}}
% The ``Jordan automorphism group of'' operator. Using
% \Aut{} is too ambiguous sometimes.
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