Solid lines in axial algebras of Jordan type 12 and Jordan algebras
Abstract
We show that a primitive axial algebra of Jordan type η = 12 is a Jordan algebra if and only if every 2-generated subalgebra is solid, a notion introduced recently by Ilya Gorshkov, Sergey Shpectorov and Alexei Staroletov. As a byproduct, we show that a subalgebra generated by axes a,b is solid if and only if the associator [La,Lb] is a derivation. Moreover, we show that 2-generated subalgebras that are not solid contain precisely 3 axes.
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