Ando type dilation for completely contractive covariant representations

Solel proved that every completely contractive covariant representation of a product system $\mathbb{E}$ over $\mathbb N^2_0$ can be dilated to an isometric representation of $\mathbb N^2_0,$ which covers Ando's dilation result when $C^{*}$-algebra $\mathcal{M} = \mathbb{C}$ and $\mathbb{E}(\mathbf{n}) = \mathbb{C},$ where $\mathbf{n}\in \mathbb N^2_0.$ That arises a natural question that exactly which type of representations dilate completely contractive covariant representation of product system $\mathbb{E}$ over $\mathbb N^2_0$? To identify the isometric covariant representations for which the above has an affirmative answer is the main object of this article.