Generalized quadrangles admitting PSL(2,q) × PSL(2,q)

First, we survey the known generalized quadrangles of order (q 2 , q), q even, including a description of their known subquadrangles of order q. Then, in the case of Tits' generalized quadrangles, we completely classify the subquadrangles of order q, while in the case of the flock quadrangles we cla

If G is a finite group and k is a field, then G is k-admissible if there exists a G-Galois extension Lrk such that L is a maximal subfield of a k-division algebra. Ž . We prove that PSL 2, 7 is k-admissible for any number field which either fails to ' contain y1 or which has two primes lying over t

## Abstract We determine the distribution of quadruple systems among the orbits of 4‐element subsets under the action of PSL(2,q) on the projective line when __q__ ≡ 1 (mod 4). © 2003 Wiley Periodicals, Inc. J Combin Designs 11: 339–351, 2003; Published online in Wiley InterScience (www.interscienc

## Abstract We determine the distribution of 3−(__q__ + 1,__k__,λ) designs, with __k__ ϵ {4,5}, among the orbits of __k__‐element subsets under the action of PSL(2,__q__), for __q__ ϵ 3 (mod 4), on the projective line. As a consequence, we give necessary and sufficient conditions for the existence

We describe symmetric designs D with classical parameters v=(q 6 -1)/(q -1), k=(q 5 -1)/(q -1), l=(q 4 -1)/(q -1), and automorphism group Aut(G 2 (q)).