Group Field Theory

We study the connection between Einstein-torsion and group field theory. We investigate the character of the $g_A\psi$ field theory with arbitrary gauge group. We find that the $g_A$ gauge group is a direct product of two non-perturbative groups. We also find that the first $g_A$ gauge group is the product of two non-perturbative groups and the second is the product of two non-perturbative groups. We also find that the connection of the $g_A$ gauge group with the first $g_A$ gauge group is involutionless. We analyze the connection of the $g_A$ gauge group with the second $g_A$ gauge group and find that the connection is involutionless. Our results also show that the connection of $g_A$ gauge group with the first $g_A$ gauge group and the second $g_A$ gauge group is involutionless. In addition to the non-perturbative group field theory, we also study the connection between the group field theory and the Einstein-torsion theory. We find that the group field theory with the $g_A$ gauge group is a direct product of two non-perturbative groups and the Einstein-torsion theory is a direct product of two non-perturbative groups.