Partitioning a graph into $\Delta$-convex sets of graphs and graph products

Given a graph $G$ and a set $S \subseteq V(G)$, we say that $S$ is $\Delta$-convex if the neighborhood of every vertex not in $S$ is an independent set. A collection ${\cal V} = (V_1, V_2, \ldots , V_p)$ of convex sets of $G$ is a convex $p$-cover if $V(G) = \underset{1 \leq i \leq p}{\bigcup} V_i$ and $V_i \nsubseteq {\underset{1 \leq j \leq p, j\ne i}{\bigcup}} V_j$ for $i \in \{1, \ldots, p\}$. If the convex sets of ${\cal V}$ are pairwise disjoint, ${\cal V}$ is a convex $p$-partition of $V(G)$. The convex cover number $\phi_c(G)$ (the convex partition number $\Theta_c(G)$) of a graph $G$ is the least integer $p \geq 2$ for which $G$ has a convex $p$-cover (convex $p$-partition). In this work, we prove that the {\sc Convex p-cover} and {\sc Convex p-Partition} problems are \NP-complete for any fixed $p \ge 4$ in $\Delta$-convexity. Furthermore, for the three standard graph products, namely, the Cartesian, strong and lexicographic products, we determine these parameters for some cases and present bounds for others.