For a fixed graph H, in the List H-Coloring problem, we are given a graph G along with list L (v) V (H) for every v V (G), and we have to determine if there exists a list homomorphism φ from (G, L) to H, i. e. , an edge preserving mapping φ: V (G) V (H) that satisfies φ (v) L (v) for every v V (G). Note that if H is the complete graph on q vertices, the problem is equivalent to List q-Coloring. We investigate the kernelization properties of List H-Coloring parameterized by the vertex cover number of G: given an instance (G, L) and a vertex cover of G of size k, can we reduce (G, L) to an equivalent instance (G', L') of List H-Coloring where the size of G' is bounded by a low-degree polynomial p (k) in k? This question has been investigated previously by Jansen and Pieterse Algorithmica 2019, who provided an upper bound, which turns out to be optimal if H is a complete graph, i. e. , for List q-Coloring. This result was one of the first applications of the method of kernelization via bounded-degree polynomials. We define two new integral graph invariants, c^* (H) and d^* (H), with d^* (H) c^* (H) d^* (H) +1, and show that for every graph H, List H-Coloring -- has a kernel with O (k^c^* (H) ) vertices, -- admits no kernel of size O (k^d^* (H) -) for any > 0, unless the polynomial hierarchy collapses. -- Furthermore, if c^* (H) > d^* (H), then there is a kernel with O (k^c^* (H) -) vertices where 2^1-c^* (H). Additionally, we show that for some classes of graphs, including powers of cycles and graphs H where Δ (H) c^* (H) (which in particular includes cliques), the bound d^* (H) is tight, using the polynomial method. We conjecture that this holds in general.
Piecyk et al. (Wed,) studied this question.
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