Two remarks on Huang's characterization of the bilinear forms graphs

We show that the bilinear forms graphs H q (n, d) of diameter d ≥ 3 are characterized as distanceregular graphs by their parameters provided that either n ≥ d + 3 and q ≥ 3, or n ≥ d + 4 and q = 2. As a corollary of the method used, we can show the following. If is a distance-regular graph with clas

An analogue of the Erd6s-Ko-Rado theorem is proved for the distance-regular graphs Hq(k, n) with k x n matrices over GF(q) as vertex set and two matrices A and B adjacent if the rank of A -B is 1, where n >~ k + 1 and (n, q) ~ (k + 1, 2). As an easy corollary, we prove that Hq(k, n) has no perfect e

St ~rl, rxprrmlrnts rlrc reporwd on the Si -So O-O transitions of chlonn (7.8-dihydroporphin) and its photorsomer m dilrfcrLn1 utrc tn u-iwune .md aoct.me single cry\t.ds b) photochemical hole-burnmgat 1 2 I<. For chlorin fifi=+O.23 I) \\a111 +kja(So) I or Uie photoproduct we esrmwe JI(SI) = 2 2 D