On cordial labeling of hypertrees

Abstract

Let f:V→Zk be a vertex labeling of a hypergraph H=(V,E). This labeling induces an~edge labeling of H defined by f(e)=Σv∈ ef(v), where the sum is taken modulo k. We say that f is k-cordial if for all a, b ∈ Zk the number of vertices with label a differs by at most 1 from the number of vertices with label b and the analogous condition holds also for labels of edges. If H admits a k-cordial labeling then H is called k-cordial. The existence of k-cordial labelings has been investigated for graphs for decades. Hovey~(1991) conjectured that every tree T is k-cordial for every k 2. Cichacz, G\"orlich and Tuza~(2013) were first to investigate the analogous problem for hypertrees, that is, connected hypergraphs without cycles. The main results of their work are that every k-uniform hypertree is k-cordial for every k 2 and that every hypertree with n or m odd is 2-cordial. Moreover, they conjectured that in fact all hypertrees are 2-cordial. In this article, we confirm the conjecture of Cichacz et al. and make a step further by proving that for k∈\2,3\ every hypertree is k-cordial.