It is known that every orientable 3-manfiold can be obtained as a ramified cover of S^{3} with a ramification (of some order) at a link in S^{3}. I am curious if there is a reasonable characterization of 3-manifolds that cover 3-torus?

Added. Notice that such a manifold is enlargeble, so it does not admit a metric of positive scalar curvature, so for example a connected sum of n copies of S^{2} x S^{1} does not admit a ramified cover of T^{3} (as far as I understand).