Embedding pseudo-complements of quadrics in PG(n, q), n⩾3, q⩾2

Hamada, N., T. Helleseth and 8. Ytrehus, Characterization of {2(q + 1) + 2, 2; t, q]-minihypers in PG(t, q) (t>3, q6{3,4}), Discrete Mathematics 115 (1993) 175-185. A set F offpoints in a finite projective geometry PG(t, q) is an (L m; t, q}-minihyper if m (>O) is the largest integer such that all

## Abstract A new infinite family of simple indecomposable one‐factorizations of the complete multigraphs is constructed by using quadrics of finite projective spaces. © 2002 Wiley Periodicals, Inc. J Combin Designs 10: 139–143, 2002; DOI 10.1002/jcd.997

## Abstract Some new families of small complete caps in __PG__(__N, q__), __q__ even, are described. By using inductive arguments, the problem of the construction of small complete caps in projective spaces of arbitrary dimensions is reduced to the same problem in the plane. The caps constructed in

## Abstract Based on the classification of superregular matrices, the numbers of non‐equivalent __n__‐arcs and complete __n__‐arcs in PG(__r__, __q__) are determined (i) for 4 ≤ __q__ ≤ 19, 2 ≤ __r__ ≤ q − 2 and arbitrary __n__, (ii) for 23 ≤ __q__ ≤ 32, __r__ = 2 and __n__ ≥ q − 8<$>. The equivale