On graphs of defect at most 2

Abstract

In this paper we consider the degree/diameter problem, namely, given natural numbers ≥ 2 and D ≥ 1, find the maximum number N(,D) of vertices in a graph of maximum degree and diameter D. In this context, the Moore bound M(,D) represents an upper bound for N(,D). Graphs of maximum degree , diameter D and order M(,D), called Moore graphs, turned out to be very rare. Therefore, it is very interesting to investigate graphs of maximum degree ≥ 2, diameter D ≥ 1 and order M(,D) - ε with small ε > 0, that is, (,D,-ε)-graphs. The parameter ε is called the defect. Graphs of defect 1 exist only for = 2. When ε > 1, (,D,-ε)-graphs represent a wide unexplored area. This paper focuses on graphs of defect 2. Building on the approaches developed in [11] we obtain several new important results on this family of graphs. First, we prove that the girth of a (,D,-2)-graph with ≥ 4 and D ≥ 4 is 2D. Second, and most important, we prove the non-existence of (,D,-2)-graphs with even ≥ 4 and D ≥ 4; this outcome, together with a proof on the non-existence of (4, 3,-2)-graphs (also provided in the paper), allows us to complete the catalogue of (4,D,-ε)-graphs with D ≥ 2 and 0 ≤ ε ≤ 2. Such a catalogue is only the second census of (,D,-2)-graphs known at present, the first being the one of (3,D,-ε)-graphs with D ≥ 2 and 0 ≤ ε ≤ 2 [14]. Other results of this paper include necessary conditions for the existence of (,D,-2)-graphs with odd ≥ 5 and D ≥ 4, and the non-existence of (,D,-2)-graphs with odd ≥ 5 and D ≥ 5 such that 0, 2 (mod D).