| Popis: |
In the past various distance based colorings on planar graphs were introduced. We turn our focus to three of them, namely $2$-distance coloring, injective coloring, and exact square coloring. A $2$-distance coloring is a proper coloring of the vertices in which no two vertices at distance $2$ receive the same color, an injective coloring is a coloring of the vertices in which no two vertices with a common neighbor receive the same color, and an exact square coloring is a coloring of the vertices in which no two vertices at distance exactly $2$ receive the same color. We prove that planar graphs with maximum degree $\Delta = 4$ and girth at least $4$ are $2$-distance list $(\Delta + 7)$-colorable and injectively list $(\Delta + 5)$-colorable. Additionally, we prove that planar graphs with $\Delta = 4$ are injectively list $(\Delta + 7)$-colorable and exact square list $(\Delta + 6)$-colorable. |
