A note on crystalline liftings in the mathbb{Q}_p case

Let $p>2$ be a prime. Let $\rho$ be a crystalline representation of $G_{\mathbb{Q}_p}$ with distinct Hodge-Tate weights in $[0, p]$, such that its reduction $\overline \rho$ is upper triangular. Under certain conditions, we prove that $\overline \rho$ has an upper triangular crystalline lift $\rho'$ such that $\mathrm{HT}(\rho')=\mathrm{HT}(\rho)$. The method is based on the author's previous work, combined with an inspiration from the work of Breuil-Herzig.