Signed Total Roman Domination and Domatic Numbers: Degree Three and Complete Multipartite Graphs

Abstract

Signed total Roman domination is a variant of the classic Roman domination-problem in graphs. A signed total Roman dominating function (STRD function) on a graph G=(V,E) is a function f: V \-1,1,2\ such that (i) Σu ∈ N(v) f(u) ≥ 1 for all v ∈ V, where N(v) denotes the neighborhood of v, and (ii) every vertex v with f(v) = -1 is adjacent to a vertex u with f(u) = 2. The weight of f is Σv ∈ V f(v). The signed total Roman domination number of G is the minimum weight among all its STRD functions. A signed total Roman dominating family (STRD family) on G is a family \f1, …, fd\ of pairwise distinct STRD functions such that Σi=1d fi(v) ≤ 1 for all v ∈ V. The signed total Roman domatic number of G is the maximum size among all its STRD families. In this paper, we relate the signed total Roman domination number of a cubic graph to its open packing number, 2-tuple total domination number, and signed total domination number, allowing us to derive sharp bounds on the first invariant and to establish new NP-completeness results for all four invariants. We demonstrate that having a degree-3 vertex determines a graph's signed total Roman domatic number. Combined with known results this implies that the associated decision problem is easy for graphs with maximum degree at most three and NP-complete otherwise. To contrast these general hardness results, we determine signed total Roman domination and domatic numbers in complete multipartite graphs. Despite their simple structure, this is a non-trivial task.