An axial algebra over the field $\mathbb F$ is a commutative algebra
generated by idempotents whose adjoint action has multiplicity-free minimal
polynomial. For semisimple associative algebras this leads to sums of copies of
$\mathbb F$. Here we consider the first nonassociative case, where adjoint
minimal polynomials divide $(x-1)x(x-\eta)$ for fixed $0\neq\eta\neq 1$. Jordan
algebras arise when $\eta=\frac{1}{2}$, but our motivating examples are certain
Griess algebras of vertex operator algebras and the related Majorana algebras.
We study a class of algebras, including these, for which axial automorphisms
like those defined by Miyamoto exist, and there classify the $2$-generated
examples. For $\eta \neq \frac{1}{2}$ this implies that the Miyamoto
involutions are $3$-transpositions, leading to a classification.Comment: 41 pages; comments welcom
A graph r is locally Petersen if, for each point t of r, the graph induced by r on all points adjacent to t is isomorphic to the Petersen graph. We prove that there are exactly three isomorphism classes of connected, locally Petersen graphs and further characterize these graphs by certain of their parameters.
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