Every symmetric cone K arises as the cone of squares in aEuclidean Jordan algebra V. As V is a real inner-productspace, we may denote by Isom (V) its group of isometries. Thegroups JAut (V) of its Jordan-algebra automorphisms andAut (K) of the linear cone automorphisms are then related. Forcertain inner products, equation*JAut (V) =Aut (K) Isom (V). equation*We characterize the inner products for which this holds.
Michael Orlitzky (Fri,) studied this question.
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