I'm trying to understand the so-called polaron transformation as frequently encountered in quantum optics. Take the following paper as example: "Quantum dot cavity-QED in the presence of strong electron-phonon interactions" by I. Wilson-Rae and A. Imamoğlu. We have the spin-phonon model with cavity desribed by the following Hamiltonian $$ H=\hbar\omega_{eg}\sigma_{ee}+\hbar\omega_ca^{\dagger}a+\hbar g(\sigma_{eg}a+a^{\dagger}\sigma_{ge})+\sum_k\hbar\omega_kb_k^{\dagger}b_k+\sigma_{ee}\sum_k\hbar\lambda_k(b_k+b_k^{\dagger})+\hbar\Omega_p(\sigma_{eg}e^{-i\omega t}+\sigma_{ge}e^{i\omega t}) $$
The polaron transformation is defined as $$ H'=e^sHe^{-s} $$ where $s=\sigma_{ee}\sum_k\frac{\lambda_k}{\omega_k}(b_k^{\dagger}-b_k)$. I have no difficulty transforming $H$ into $H'$ using the results I found $$ e^s\sigma_{ge}e^{-s}=\sigma_{ge}\exp{\sum_k}\frac{\lambda_k}{\nu_k}(b_k^{\dagger}-b_k) $$ and $$ e^sb_k e^{-s}=b_k-\frac{\lambda_k}{\omega_k}\sigma_{ee} $$ But I just don't know how to get the following transformed Hamiltonian in terms of $\left<B\right>$, $B_+$, $B_-$ and also $X_g$ and $X_u$: $$ H^{\prime}=H_{s y s}^{\prime}+H_{i n t}^{\prime}+H_{b a t h}^{\prime} $$ with $$ \begin{align} H_{b a t h}^{\prime}&=\sum_{k} \omega_{k} b_{k}^{\dagger} b_{k} \\ H_{s y s}^{\prime}&=\hbar \omega \sigma_{00}+\hbar \omega_{c} \sigma_{11}+\hbar\left(\omega_{e g}-\Delta\right) \sigma_{22}+\langle B\rangle X_{g} \\ H_{i n t}^{\prime}&=X_{g} \xi_{g}+X_{u} \xi_{u} \end{align} $$ with the definition of $\left<B\right>$, $B_+$, $B_-$, $X_g$ and $X_u$ defined as follows: \begin{align} X_{g}&=\hbar\left[g\left(\sigma_{21}+\sigma_{12}\right)+\Omega_{p}\left(\sigma_{20}+\sigma_{02}\right)\right] \\ X_{u}&=i \hbar\left[g\left(\sigma_{12}-\sigma_{21}\right)+\Omega_{p}\left(\sigma_{02}-\sigma_{20}\right)\right] \\ B_{\pm}&=\exp \left(\pm \sum_{k} \frac{\lambda_{k}}{\omega_{k}}\left(b_{k}-b_{k}^{\dagger}\right)\right) \\ \xi_{g}&=\frac{1}{2}\left(B_{+}+B_{-}-2\langle B\rangle\right) \\ \xi_{u}&=\frac{1}{2 i}\left(B_{+}-B_{-}\right) \end{align}
What is the physical intuition of introducing these operators? In particular, why do we need to introduce $X_u$ and $\xi_u$ with an imaginary number $i$ at the front where in the original Hamiltonian $H$ there wasn't even any $i$?
This polaron transformation approach has been adopted by many recent studies so I really want to understand what's happening clearly but I couldn't find any lecture notes or textbooks on this. I would appreciate any help, explanation or book/paper recommendation greatly. Thank you.
