$u$-channel in $gg \rightarrow u\bar{u}$

Question

I've seen that for the QCD process $gg \rightarrow u\bar{u}$, where $g$ is a gluon and $u, \bar{u}$ are the up quark and the corresponding antiquark, there is $s$, $t$ and $u$ channels.

I perfectly understand the existence of $s$ and $t$ channels but I don't get how is $u$ channel possible. For $e^+e^- \rightarrow e^+e^-$ there isn't $u$ channel due to positron and electron are not identical, so why is this channel in the QCD process if quark and antiquark are not identical? Is not the same scheme?

Answer 1

Is not the same.

For e+e- -> e+e- the t-channel is a photon exchange, that takes into account electric charge conservation. This last constraint rules out the u-channel.

For gg-> quark anti-quark, you have a t-channel exchanging a quark. And you have a u-channel also by exchanging the initial legs. Note that these are different amplitudes. On the t-channel you can have a vertex involving (g(p1_in),u(p1_out),intermediate_quark) while on the u-channel you would have this vertex with (g(p2_in),u(p1_out),intermediate_quark). Here I have denoted the momentum as p_i.