论文信息 - On Modular k-Free Sets

On Modular k-Free Sets

Let $n$ and $k$ be integers. A set $A\subset\mathbb{Z}/n\mathbb{Z}$ is $k$-free if for all $x$ in $A$, $kx\notin A$. We determine the maximal cardinality of such a set when $k$ and $n$ are coprime. We also study several particular cases and we propose an efficient algorithm for solving the general case. We finally give the asymptotic behaviour of the minimal size of a $k$-free set in $\left[ 1,n\right]$ which is maximal for inclusion.

Victor Lambert | V. Lambert

[1] E. Wright,et al. Theorems in the additive theory of numbers , 2022 .

[2] J. Singer. A theorem in finite projective geometry and some applications to number theory , 1938 .

[3] R. C. Bose,et al. Theorems in the additive theory of numbers , 1962 .

[4] K. O'Bryant. A Complete Annotated Bibliography of Work Related to Sidon Sequences , 2004, math/0407117.

[5] Imre Z. Ruzsa,et al. Solving a linear equation in a set of integers I , 1993 .

[6] Javier Cilleruelo,et al. k-Fold Sidon Sets , 2014, Electron. J. Comb..

[7] David R. Wood,et al. On Multiplicative Sidon Sets , 2013, Integers.

[8] Felix Lazebnik,et al. On Hypergraphs of Girth Five , 2003, Electron. J. Comb..