I posted this question on MSE earlier, however could not elicit a reply. I am not sure if this belongs here, if not, please flag it. Moreover, I am not sure what tags to put on it, so if this question remains, please add appropriate tags.
I was reading Bruhat Tits' "Groupes réductifs sur un corps local : I. Données radicielles valuées", available here.
Let $(G,B,N,S)$ be a Tits system and $\phi : G \to G^{'}$ be a group homomorphism. It is called $B-$adapted (resp. $BN-$ adapted) if
- $\ker (\phi) \subset B$, and
- for every $g \in G^{'}$, there exists a $h\in G$ such that $\phi(hBh^{-1}) = g\phi(B)g^{-1}$ (resp. $\phi(hBh^{-1}) = g\phi(B)g^{-1}$ and $\phi(hNh^{-1}) = g\phi(N)g^{-1})$
Now let $\phi : G \to G^{'}$ be $B-$adapted.
In (1.2.14) Page 18 they claim that $\phi(G)$ is a normal subgroup of $G^{'}$ since we have the Bruhat decomposition. However, if I compute for some $w \in W$ (or equivalently $w \in N$)
$$ g\phi(BwB)g^{-1} = g\phi(B)\phi(w)\phi(B)g^{-1} = g\phi(B)g^{-1}g\phi(w)g^{-1}g\phi(B)g^{-1} = \phi(hBh^{-1})g\phi(w)g^{-1}\phi(hBh^{-1}), $$
I cannot take $g$ inside $\phi$ for $w$ since $\phi$ is only assumed to be $B-$adapted. I think we also need $BN-$adapted.
Am I missing something?