On equivariant maps related to the space of pairs of exceptional Jordan algebras
Abstract
Let J be the exceptional Jordan algebra and V=J J. We construct an equivariant map from V to Homk(J J,J) defined by homogeneous polynomials of degree 8 such that if x∈ V is a generic point, then the image of x is the structure constant of the isotope of J corresponding to x. We also give an alternative way to define the isotope corresponding to a generic point of J by an equivariant map from J to the space of trilinear forms.
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