The Cutkosky rule of three dimensional noncommutative field theory in Lie algebraic noncommutative spacetime

Abstract

We investigate the unitarity of three dimensional noncommutative scalar field theory in the Lie algebraic noncommutative spacetime [xi,xj]=2i kappa epsilonijkxk. This noncommutative field theory possesses a SL(2,R)/Z2 group momentum space, which leads to a Hopf algebraic translational symmetry. We check the Cutkosky rule of the one-loop self-energy diagrams in the noncommutative phi3 theory when we include a braiding, which is necessary for the noncommutative field theory to possess the Hopf algebraic translational symmetry at quantum level. Then, we find that the Cutkosky rule is satisfied if the mass is less than 1/(2(1/2)kappa).