A New Feasibility Condition for the AT4 Family

Abstract

Let be an antipodal distance-regular graph with diameter 4 and eigenvalues θ0>θ1>θ2>θ3>θ4. Then is tight in the sense of Jurisi\'c, Koolen, and Terwilliger [12] whenever is locally strongly regular with nontrivial eigenvalues p:=θ2 and -q:=θ3. Assume that is tight. Then the intersection numbers of are expressed in terms of p, q, and r, where r is the size of the antipodal classes of . We denote by AT4(p,q,r) and call this an antipodal tight graph of diameter 4 with parameters p,q,r. In this paper, we give a new feasibility condition for the AT4(p,q,r) family. We determine a necessary and sufficient condition for the second subconstituent of AT4(p,q,2) to be an antipodal tight graph. Using this condition, we prove that there does not exist AT4(q3-2q,q,2) for q3 (mod~4). We discuss the AT4(p,q,r) graphs with r=(p+q3)(p+q)-1.