Your search keyword '"Giulietti, Massimo"' showing total 11 results

1. Line partitions of internal points to a conic in PG(2,q)

Author

Giulietti, Massimo

Subjects

Mathematics - Combinatorics, 51E21

Abstract

All sets of lines providing a partition of the set of internal points to a conic C in PG(2,q), q odd, are determined. There exist only three such linesets up to projectivities, namely the set of all nontangent lines to C through an external point to C, the set of all nontangent lines to C through a point in C, and, for square q, the set of all nontangent lines to C belonging to a Baer subplane with at least 5 common points with C. This classification theorem is the analogous of a classical result by Segre and Korchmaros characterizing the pencil of lines through an internal point to C as the unique set of lines, up to projectivities, which provides a partition of the set of all noninternal points to C. However, the proof is not analogous, since it does not rely on the famous Lemma of Tangents of Segre. The main tools in the present paper are certain partitions in conics of the set of all internal points to C, together with some recent combinatorial characterizations of blocking sets of non-secant lines, and of blocking sets of external lines.

Published

2006

2. On Hyperfocused Arcs in PG(2,q)

Author

Giulietti, Massimo and Montanucci, Elisa

Subjects

Mathematics - Combinatorics, 51E21

Abstract

A k-arc in a Dearguesian projective plane whose secants meet some external line in k-1 points is said to be hyperfocused. Hyperfocused arcs are investigated in connection with a secret sharing scheme based on geometry due to Simmons. In this paper it is shown that point orbits under suitable groups of elations are hyperfocused arcs with the significant property of being contained neither in a hyperoval, nor in a proper subplane. Also, the concept of generalized hyperfocused arc, i.e. an arc whose secants admit a blocking set of minimum size, is introduced: a construction method is provided, together with the classification for size up to 10.

Published

2006

3. New bounds for linear codes of covering radii 2 and 3

Author

Bartoli, Daniele, Davydov, Alexander A., Giulietti, Massimo, Marcugini, Stefano, and Pambianco, Fernanda

Published

2019

4. Linear codes from Denniston maximal arcs

Author

Bartoli, Daniele, Giulietti, Massimo, and Montanucci, Maria

Published

2019

5. Complete ( k , 3 ) -arcs from quartic curves

Author

Bartoli, Daniele, Giulietti, Massimo, and Zini, Giovanni

Published

2016

6. Arcs in AG(2, q) determining few directions

Author

Giulietti, Massimo and Korchmáros, Gábor

Published

2013

7. Transitive A 6-invariant k-arcs in PG(2, q)

Author

Giulietti, Massimo, Korchmáros, Gábor, Marcugini, Stefano, and Pambianco, Fernanda

Published

2013

8. Line partitions of internal points to a conic in PG(2,q)

Author

Giulietti, Massimo

Published

2009

9. Small complete caps inPG(2,q), forq an odd square

Author

Giulietti, Massimo

Published

2000

10. On sharply transitive sets in $\mathsf{PG}(2,q)$

Author

Davydov, Alexander A., Giulietti, Massimo, Marcugini, Stefano, and Pambianco, Fernanda

Subjects

complete arcs, intersection numbers, transitive arcs, 51E21

Abstract

In [math] a point set [math] is sharply transitive if the collineation group preserving [math] has a subgroup acting on [math] as a sharply transitive permutation group. By a result of Korchmáros, sharply transitive hyperovals only exist for a few values of [math] , namely [math] and [math] . In general, sharply transitive complete arcs of even size in [math] with [math] even seem to be sporadic. In this paper, we construct sharply transitive complete [math] -arcs for [math] , [math] . As far as we are concerned, these are the smallest known complete arcs in [math] and in [math] ; also, [math] seems to be a new value of the spectrum of the sizes of complete arcs in [math] . Our construction applies to any [math] which is an odd power of [math] , but the problem of the completeness of the resulting sharply transitive arc remains open for [math] . In the second part of this paper, sharply transitive subsets arising as orbits under a Singer subgroup are considered and their characters, that is the possible intersection numbers with lines, are investigated. Subsets of [math] and certain linear codes are strongly related and the above results from the point of view of coding theory will also be discussed.

Published

2007

11. Complete $$(k,3)$$ -arcs from quartic curves.

Author

Bartoli, Daniele, Giulietti, Massimo, and Zini, Giovanni

Subjects

QUARTIC curves, PROJECTIVE planes, FINITE fields, INFINITE groups, MAGNITUDE (Mathematics)

Abstract

Complete $$(k,3)$$ -arcs in projective planes over finite fields are the geometric counterpart of linear non-extendible Near MDS codes of length $$k$$ and dimension $$3$$ . A class of infinite families of complete $$(k,3)$$ -arcs in $${\mathrm {PG}}(2,q)$$ is constructed, for $$q$$ a power of an odd prime $$p\equiv 2 ( { \, \mathrm{mod}\,}3)$$ . The order of magnitude of $$k$$ is smaller than $$q$$ . This property significantly distinguishes the complete $$(k,3)$$ -arcs of this paper from the previously known infinite families, whose size differs from $$q$$ by at most $$2\sqrt{q}$$ . [ABSTRACT FROM AUTHOR]

Published

2016