A characterization of PGL(2, q), q odd

Following the lines of [10], we give a characterization of the group PGL(2, q), q odd, in terms of involutions.Work performed under the auspicies of G.N.S.A.C.A. of C.N.R. supported by the 40% grants of M.P.I.     

On symplectic semifield spreads of $$\hbox {PG}(5, q^2)$$PG(5, q2), q even

We prove that the only symplectic semifield spreads of \(\hbox {PG}(5,q^2)\), \(q\ge 2^{14}\) even, whose associated semifield has center containing \({\mathbb F}_q\), is the Desarguesian spread, by proving that the only \({\mathbb F}_q\)-linear set of rank 6 disjoint from the secant variety of the Veronese surface of \(\hbox {PG}(5,q^2)\) is a plane with three points of the Veronese surface of \(\hbox {PG}(5,q^6){\setminus } \hbox {PG}(5,q^2)\).     

当$4q^{5}-5q^{4}-2q+1\leq d \leq 4q^{5}-5q^{4}-q$时$[g_{q}(6,d),6,d]_{q}$码的不存在性

证明了对于q≥17,当4q~5-5q~4-2q+1≤d≤4q~5-5q~4-q时,不存在达到Griesmer界的[n,k,d]_q码.此结果推广了Cheon等人在2005年和2008年的非存在性定理.     

The affine planeAG(2,q),q odd,has a unique one point extension

Summary LetJ be a finite inversive plane of odd orderq. If for at least one pointp ofJ the internal affine planeJ _p is Desarguesian, thenJ is Miquelian. Other formulation: the finite Desarguesian affine plane of odd orderq has a unique one point extension; this extension is the Miquelian inversive plane of orderq. It follows that there is a unique inversive plane of orderq, withq{3, 5, 7}.Oblatum 23-X-1992 & 24-I-1994     

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

An interesting class ofk-arcs withk=4(–1) in the projective plane overGF(q) is constructed forq an odd square; the construction yields many complete arcs of small size inPG(2,q) whenq2401.The research was supported by Italian MURST progetto 40%Strutture Geometriche, Combinatoria e loro applicazioni and by CNR Progetto StrategicoApplicazioni della matematica per la tecnologia e la società sottoprogettoCalcolo simbolico and by GNSAGA.     

Blocking sets of nonsecant lines to a conic in PG(2,q), q odd

In a previous paper 1 , all point sets of minimum size in PG(2,q), blocking all external lines to a given irreducible conic , have been determined for every odd q. Here we obtain a similar classification for those point sets of minimum size, which meet every external and tangent line to . © 2004 Wiley Periodicals, Inc.     

On extendable planes,M.D.S. codes and hyperovals in PG(2, q), q=2 t

The question of the existence of finite planes seems to be beyond the range of present techniques. In this paper we skirmish with an easier question: extendable planes. We show how extendable planes arise as special cases of certain maximum distance separable codes (M.D.S. codes). A synthetic characterization of extendable planes is obtained. A different characterization is obtained in terms of hyperoval systems. Moreover, since =PG(2, q), q=2 ^t , is extendable this leads to new insights concerning the subtle and marvellous structure of certain hyperoval systems in . A priori, it seems somewhat surprising that very much can be said about hyperovals in , as they have certainly not been classified. In particular, we obtain a partial generalization of the famous even intersection property of hyperovals in PG(2, 4). We conclude with a discussion of hyperoval spreads and packings in along with some open questions.     

Infinite family of large complete arcs in PG(2, q n ), with q odd and n > 1 odd

For q odd and n > 1 odd, a new infinite family of large complete arcs K′ in PG(2, q ⁿ ) is constructed from complete arcs K in PG(2, q) which have the following property with respect to an irreducible conic ${\mathcal{C}}$ in PG(2, q): all the points of K not in ${\mathcal{C}}$ are all internal or all external points to ${\mathcal{C}}$ according as q ≡ 1 (mod 4) or q ≡ 3 (mod 4).     

A spectrum result on minimal blocking sets with respect to the planes of PG(3, q), q odd

This article presents a spectrum result on minimal blocking sets with respect to the planes of PG(3, q), q odd. We prove that for every integer k in an interval of, roughly, size [q ²/4, 3q ²/4], there exists such a minimal blocking set of size k in PG(3, q), q odd. A similar result on the spectrum of minimal blocking sets with respect to the planes of PG(3, q), q even, was presented in Rößing and Storme (Eur J Combin 31:349–361, 2010). Since minimal blocking sets with respect to the planes in PG(3, q) are tangency sets, they define maximal partial 1-systems on the Klein quadric Q ⁺(5, q), so we get the same spectrum result for maximal partial 1-systems of lines on the Klein quadric Q ⁺(5, q), q odd.     

An infinite family of type (m,n) sets in PG(2,q2), q a square

A k-set of type (m,n), with k=(q+√q+1)(q²?q+1), m= 1+√q, n=q+√q+1, is proved to exist in a Galois plane PG(2,q²), q a square, and its construction is given. Thus, its complement, i.e. a ((q?√q)(q+√q+1)(q²?q+1); √q(q√q?√q?1),√q(q √q?1))-set, exists too. The special case q=16 is considered and the points of a (91;3,7)-set in PG(2,16) are exhibited. A generalization is given.     

Proper 2-Covers of PG(3,q), q Even

A k-cover of =PG(3q) is a set S of lines of such that every point is on exactly k lines of S. S is proper if it contains no spread. The existence of proper k-covers of is necessary for the existence of maximal partial packings of q ²+q+1–k spreads of . Here we give the first construction of proper 2-packings of PG(3,q) with q even; for q odd these have been constructed by Ebert.