On the irreducible representations of the Jordan triple system of p × q matrices

Abstract

Let J be the Jordan triple system of all p × q (p≠ q; p,q >1) rectangular matrices over a field of characteristic 0 with the triple product \x,y,z\= x yt z+ z yt x , where yt is the transpose of y. We study the universal associative envelope U(J) of J and show that U(J) Mp+q × p+q(), where Mp+q× p+q () is the ordinary associative algebra of all (p+q) × (p+q) matrices over . It follows that there exist only one nontrivial irreducible representation of J. The center of U(J) is deduced.