#### Filter Results:

- Full text PDF available (52)

#### Publication Year

1987

2018

- This year (8)
- Last 5 years (47)
- Last 10 years (84)

#### Publication Type

#### Co-author

#### Journals and Conferences

Learn More

- Daniele Bartoli, Alexander A. Davydov, Giorgio Faina, Stefano Marcugini, Fernanda Pambianco
- Discrete Mathematics
- 2012

New upper bounds on the smallest size t2(2, q) of a complete arc in the projective plane PG(2, q) are obtained for 853 ≤ q ≤ 3467 and q ∈ T1 ∪ T2 where T1 = {173, 181, 193, 229, 243, 257, 271, 277,… (More)

In the projective planes PG(2, q), more than 1230 new small complete arcs are obtained for q ≤ 13627 and q ∈ G where G is a set of 38 values in the range 13687, . . . , 45893; also, 2 ∈ G. This… (More)

- Alexander A. Davydov, Stefano Marcugini, Fernanda Pambianco
- J. Comb. Theory, Ser. A
- 2003

More than thirty new upper bounds on the smallest size t2(2, q) of a complete arc in the plane PG(2, q) are obtained for 169 ≤ q ≤ 839. New upper bounds on the smallest size t2(n, q) of the complete… (More)

- Alexander A. Davydov, Giorgio Faina, Stefano Marcugini, Fernanda Pambianco
- IEEE Transactions on Information Theory
- 2005

A concept of locally optimal (LO) linear covering codes is introduced in accordance with the concept of minimal saturating sets in projective spaces over finite fields. An LO code is nonshortening in… (More)

Some new families of small complete caps in P G(N, q), q even, are described. By using inductive arguments, the problem of the construction of small complete caps in projective spaces of arbitrary… (More)

- Fernanda Pambianco, Leo Storme
- Ars Comb.
- 2008

We classify the minimal blocking sets of size 15 in PG(2, 9). We show that the only examples are the projective triangle and the sporadic example arising from the secants to the unique complete 6-arc… (More)

For a prime power q and for integers R, η with R > 0, 0 ≤ η ≤ R − 1, let A R,q = (Cni)i denote an infinite sequence of q-ary linear [ni, ni − ri]qR codes Cni with covering radius R and such that the… (More)

We give a geometric interpretation of additive quantum stabilizer codes in terms of sets of lines in binary symplectic space. It is used to obtain synthetic geometric constructions and non-existence… (More)