Consider the following NLS:
$$i u_t + \Delta u- 2 \operatorname{Re} u = F(u),$$
where $f(u):=(u + \bar{u} + |u|^2)u.$
The author used a change of variables to get the free evolution as a unitary group:
$$u \mapsto v:=V^{-1}u:= U^{-1} \operatorname{Re} u + i \operatorname{Im}u,$$
where $U:=\sqrt{- \Delta (2-\Delta)^{-1}}$.
Then $v$ satisfies the equation
$$i u_t v - \sqrt{- \Delta (2-\Delta)} v = - i V^{-1} i F(V v).$$
I have been trying to understand the motivation of this change of variable but no result! The main obstacles for me is the squire root, I can not see where the square root came from? Any help is appreciated.