Korovkin-type results and doubly stochastic transformations over Euclidean Jordan algebras

Abstract

A well-known theorem of Korovkin asserts that if \Tk\ is a sequence of positive linear transformations on C[a,b] such that Tk(h)→ h (in the sup-norm on C[a,b]) for all h∈ \1,φ,φ2\, where φ(t)=t on [a,b], then Tk(h)→ h for all h∈ C[a,b]. In particular, if T is a positive linear transformation on C[a,b] such that T(h)=h for all h∈ \1,φ,φ2\, then T is the Identity transformation. In this paper, we present some analogs of these results over Euclidean Jordan algebras. We show that if T is a positive linear transformation on a Euclidean Jordan algebra V such that T(h)=h for all h∈ \e,p,p2\, where e is the unit element in V and p is an element of V with distinct eigenvalues, then T=T*=I (the Identity transformation) on the span of the Jordan frame corresponding to the spectral decomposition of p; consequently, if a positive linear transformation coincides with the Identity transformation on a Jordan frame, then it is doubly stochastic. We also present sequential and weak-majorization versions.