On the feedback number of 3-uniform hypergraph

Abstract

Let H=(V,E) be a hypergraph with vertex set V and edge set E. S⊂eq V is a feedback vertex set (FVS) of H if H S has no cycle and τc(H) denote the minimum cardinality of a FVS of H. In this paper, we prove (i) if H is a linear 3-uniform hypergraph with m edges, then τc(H) m/3. (ii) if H is a 3-uniform hypergraph with m edges, then τc(H) m/2 and furthermore, the equality holds on if and only if every component of H is a 2-cycle. Let H=(V,E) be a hypergraph with vertex set V and edge set E. A⊂eq E is a feedback edge set (FES) of H if H A has no cycle and τc'(H) denote the minimum cardinality of a FES of H. In this paper, we prove if H is a 3-uniform hypergraph with p components, then τc'(H) 2m-n+p.