The square of every subcubic planar graph without 4-cycles and 5-cycles is 7-choosable

The square of a graph $G$, denoted by $G^2$, has the same vertex set as $G$ and has an edge between two vertices if the distance between them in $G$ is at most $2$. Thomassen (2018) and independently, Hartke, Jahanbekam and Thomas (2016) proved that $χ(G^2) \leq 7$ if $G$ is a subcubic planar graph. A natural question is whether $χ_{\ell}(G^2) \leq 7$ or not if $G$ is a subcubic planar graph. Recently, Kim and Lian (2024) proved that $χ_{\ell}(G^2) \leq 7$ if $G$ is a subcubic planar graph of girth at least 6. In this paper, we prove that $χ_{\ell}(G^2) \leq 7$ if $G$ is a subcubic planar graph without 4-cycles and 5-cycles, which improves the result of Kim and Lian.