The question is simple:

Let A be associative real algebra and A(+) the related jordan algebra with product A * B= 1/2(AB+BA). The centre of A(+) denoted by z(A(+) ) (set of ''operator commute'' i.e. J_a (x ) = x * a ) is it equal to Ac ?

where Ac is the set of elements belongs to A such that ab=ba for all b in A.

We have that Ac is contained in z(A(+) ), but I dont know when it is equal.

we recall that if A is associative algebra of bounded linear operator on Hilbert space, for each a,b self adjoint operators we have (see Topping 1965 prop.1)

ab=ba if and only if J_a J_b = J_b J_a

Thank You

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