Let G be an algerbraic group, and X be a G-variety (that I will assume to be smooth). Then one can consider a simlicial variety whose terms are $G^i\times X$. This simplicial variety yields a 'complex of varieties' $\dots\to G\times G\times X\to G\times X\to X$ (the arrows are formal alternating sums of the corresponding morphisms of varieties), which yields a Voevodsky's motivic complex. Is the motif obtained isomorphic to anything 'nice'; did someone already consider it (or something similar)? 

Certainly, one could speculate (mimicking the definition of the cohomology of a module over a group $G$) that $\dots\to G\times G\times G\to G\times G\to G$ is a 'resolution' of $\mathbb{Z}=M(pt)$ in a certain category of $G$-motives, and the complex I mentioned is $RHom(\mathbb{Z},X)$ in this category; yet this doesn't seem to help. Another association is Vishik's complex  $\dots\to X\times X\times X\to X\times X\times X\to pt$; this does not seem to be helpful either.