We study a turbulence closure model in which the fractional Laplacian (-Δ)α of the velocity field represents the turbulence diffusivity. We investigate the energy spectrum of the model by applying Pao\u27s energy transfer theory. For the case α = 1/3, the corresponding power law of the energy spectrum in the inertial range has a correction exponent on the regular Kolmogorov -5/3 scaling exponent. For this case, this model represents Richardson\u27s particle pair-distance superdiffusion of a fully developed homogeneous turbulent flow as well as Lévy jumps that lead to the superdiffusion. For other values of α, the power law of the energy spectrum is consistent with the regular Kolmogorov -5/3 scaling exponent. We also propose and study a mod...