On potentially Kr+1-U-graphical Sequences

Abstract

Let Km-H be the graph obtained from Km by removing the edges set E(H) of the graph H (H is a subgraph of Km). We use the symbol Z4 to denote K4-P2. A sequence S is potentially Km-H-graphical if it has a realization containing a Km-H as a subgraph. Let σ(Km-H, n) denote the smallest degree sum such that every n-term graphical sequence S with σ(S)≥ σ(Km-H, n) is potentially Km-H-graphical. In this paper, we determine the values of σ (Kr+1-U, n) for n≥ 5r+18, r+1 ≥ k ≥ 7, j ≥ 6 where U is a graph on k vertices and j edges which contains a graph K3 P3 but not contains a cycle on 4 vertices and not contains Z4. There are a number of graphs on k vertices and j edges which contains a graph (K3 P3) but not contains a cycle on 4 vertices and not contains Z4. (for example, C3 Ci1 Ci2 >... Cip (ij≠ 4, j=2,3,..., p, i1 ≥ 5), C3 Pi1 Pi2 ... Pip (i1 ≥ 3), C3 Pi1 Ci2 >... Cip (ij≠ 4, j=2,3,..., p, i1 ≥ 3), etc)