On a characterization of the Grassmann graphs

Abstract

In 1995, Metsch showed that the Grassmann graph Jq(n,D) of diameter D≥ 3 is characterized by its intersection numbers with the following possible exceptions: (-) n=2D or n=2D+1, q≥ 2; (-) n=2D+2 and q∈ \2,3\; (-) n=2D+3 and q=2. In 2005, Van Dam and Koolen constructed the twisted Grassmann graphs with the same intersection numbers as the Grassmann graphs Jq(2D+1,D), for any prime power q and diameter D≥ 2, but they are not isomorphic. We show that the Grassmann graph Jq(2D,D) is characterized by its intersection numbers provided that the diameter D is large enough.