Author: "Nagy, Zoltan Lorant" / Publication Year Range: This year - Searchworks@Jio Institute Digital Library Search Results

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Author: Kovács, Benedek, Nagy, Zoltán Lóránt, and Szabó, Dávid R.
Subjects: Mathematics - Combinatorics, 51E21
Abstract: In this paper, we study the cardinality of the smallest set of lines of the finite projective spaces $\operatorname{PG}(n,q)$ such that every plane is incident with at least one line of the set. This is the first main open problem concerning the minimum size of $(s,t)$-blocking sets in $\operatorname{PG}(n,q)$, where we set $s=2$ and $t=1$. In $\operatorname{PG}(n,q)$, an $(s,t)$-blocking set refers to a set of $t$-spaces such that each $s$-space is incident with at least one chosen $t$-space. This is a notoriously difficult problem, as it is equivalent to determining the size of certain $q$-Tur\'an designs and $q$-covering designs. We present an improvement on the upper bounds of Etzion and of Metsch via a refined scheme for a recursive construction, which in fact enables improvement in the general case as well., Comment: 21 pages
Published: 2024

Author: Héger, Tamás and Nagy, Zoltán Lóránt
Subjects: Mathematics - Combinatorics
Abstract: Let $q$ be a prime power and $k$ be a natural number. What are the possible cardinalities of point sets ${S}$ in a projective plane of order $q$, which do not intersect any line at exactly $k$ points? This problem and its variants have been investigated before, in relation with blocking sets, untouchable sets or sets of even type, among others. In this paper we show a series of results which point out the existence of all or almost all possible values $m\in [0, q^2+q+1]$ for $|S|=m$, provided that $k$ is not close to the extremal values $0$ or $q+1$. Moreover, using polynomial techniques we show the existence of a point set $S$ with the following property: for every prescribed list of numbers $t_1, \ldots t_{q^2+q+1}$, $|S\cap \ell_i|\neq t_i$ holds for the $i$th line $\ell_i$, $\forall i \in \{1, 2, \ldots, q^2+q+1\}$.
Published: 2024

Author: Nagy, Zoltán Lóránt
Subjects: Mathematics - Combinatorics
Abstract: An internal or friendly partition of a vertex set $V(G)$ of a graph $G$ is a partition to two nonempty sets $A\cup B$ such that every vertex has at least as many neighbours in its own class as in the other one. Motivated by Diwan's existence proof on internal partitions of graphs with high girth, we give constructive proofs for the existence of internal partitions in the incidence graph of projective planes and discuss its geometric properties. In addition, we determine exactly the maximum possible difference between the sizes of the neighbor set in its own class and the neighbor set of the other class, that can be attained for all vertices at the same time for the incidence graphs of desarguesian planes of square order.
Published: 2024

Author: Csajbók, Bence and Nagy, Zoltán Lóránt
Subjects: Mathematics - Combinatorics, Mathematics - Number Theory, 51E21, 11B25, 05D05
Abstract: A subset $S$ of an abelian group $G$ is called $3$-$\mathrm{AP}$ free if it does not contain a three term arithmetic progression. Moreover, $S$ is called complete $3$-$\mathrm{AP}$ free, if it is maximal w.r.t. set inclusion. One of the most central problems in additive combinatorics is to determine the maximal size of a $3$-$\mathrm{AP}$ free set, which is necessarily complete. In this paper we are interested in the minimum size of complete $3$-$\mathrm{AP}$ free sets. We define and study saturation w.r.t. $3$-$\mathrm{AP}$s and present constructions of small complete $3$-$\mathrm{AP}$ free sets and $3$-$\mathrm{AP}$ saturating sets for several families of vector spaces and cyclic groups., Comment: Definition 1.8, Proposition 2.3, Theorem 4.14 and Corollary 4.15 are revised
Published: 2024

Author: Barát, János, Grzesik, Andrzej, Jung, Attila, Nagy, Zoltán Lóránt, and Pálvölgyi, Dömötör
Published: 2024
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