On the Schur indices of characters ofGL(2,q) andGL(3,q)

It is unknown whether or not there exists an [87, 5, 57 ; 31-code. Such a code would meet the Griesmer bound. The purpose of this paper is to give a constructive proof of the existence of [q4 + q2 \_ q, 5, q'\* -q3 + q2 \_ 2q; q]-codes for any prime power q \_> 3. As a special case, it is shown that

Two results are proved: (1) In PG(3, q), q=2 h, h>~3, every q3-arc can be uniquely completed to a (q + 1)3-arc. (2) In PG(4, q), q = 2", h ~> 3, every (q + 1)4-arc is a normal rational curve. ## 1. In~oduction We assume throughout this paper that the base field GF(q) is of order q = 2 h, where h i

## Abstract Current literature provides more than 30 patients with interstitial deletions in chromosome 2q31q33. Only a few of them were studied using high‐resolution methods. Among these, two patients had presented with a particular consistence of some clinical features associated to a deletion be