Caps and Veronese varieties in projective Galois spaces

A family of caps constructed by G. L. Ebert, K. Metsch and T. Szönyi [8] results from projecting a Veronesian or a Grassmannian to a suitable lower-dimensional space. We improve on this construction by projecting to a space of much smaller dimension. More precisely, we partition P G(3r -1, q) into a

We construct caps in projective 4-space PG(4, q) in odd characteristic, whose cardinality is O( q).

## Abstract We treat __n__‐dimensional real submanifolds of complex projective spaces in the case when the maximal holomorphic tangent subspace is (__n__ ‐ 1)‐dimensional. In particular, we study the case when the induced almost contact structure on a submanifold is contact, we establish a few char

Clark, W.E., Blocking sets in finite projective spaces and uneven binary codes, Discrete Mathematics 94 (1991) 65-68. A l-blocking set in the projective space PG(m, 2), m >2, is a set B of points such that any (m -I)-flat meets B and no l-flat is contained in B. A binary linear code is said to be un