On the connectivity of certain graphs of high girth

Let q be a prime power and k greater than or equal to 2 be an integer. Lazebnik et al. (Rutcor Research Report RRR 99-93, 1993; Bull. AMS 32 (1) (1995) 73) determined that the number of components of certain graphs D(k,q) introduced by Lazebnik and Ustimenko (Discrete Appl. Math. 60 (1995) 275) is at least q(t-1) where t = [(k + 2)/4]. This implied that these components (most often) provide the best-known asymptotic lower bound for the greatest number of edges in graphs of their order and girth. Lazebnik et al. (Discrete Math. 157 (1996) 271) showed that the number of components is (exactly) q(t-1) for q odd, but the method used there failed for q even. In this paper we prove that the number of components of D(k, q) for even q > 4 is again q(t-1) where t = [(k + 2)/4]. Our proof is independent of the parity of q as long as q > 4. Furthermore, we show that for q = 4 and k greater than or equal to 4, the number of components is q. (C) 2003 Elsevier B.V. All rights reserved.