Automatic additivity for injective Jordan semi-triple maps on structural matrix rings over division rings

Abstract

Let D be a division ring, and let R⊂eq Mn(D) be a structural matrix ring over D, that is, the subring of Mn(D) supported on the ordered pairs of a preorder on \1,…,n\. We study injective Jordan semi-triple maps ϕ:R Mn(D), namely injective maps satisfying \[ ϕ(XYX)=ϕ(X)ϕ(Y)ϕ(X), for all X,Y∈R. \] Assuming that the centre of D has more than two elements, we give a criterion for automatic additivity and show that there are exactly two obstructions. The first one is scalar: it occurs precisely when R has a direct ring summand isomorphic to D and D is isomorphic to neither F3 nor F4. The second one is order-theoretic: it occurs when a nonsymmetric comparable pair i j, j i, admits no third index k\i,j\ comparable with both i and j. If neither obstruction occurs, all injective Jordan semi-triple maps are additive. The centre-size hypothesis is sharp: for n3, the upper-triangular ring Tn(F2) has neither obstruction but nevertheless admits nonadditive injective Jordan semi-triple maps. Finally, in the additive case, we describe the maps componentwise, in terms of endomorphisms, anti-endomorphisms, and transitive multipliers.