For positive integers $n$ and $m$, consider a multiset of non-empty subsets of $[m]$ such that there is a \textit{unique} partition of these subsets into $n$ partitions of $[m]$. We study the maximum possible size $g(n,m)$ of such a multiset. We focus on the regime $n \leq 2^{m-1}-1$ and show that $g(n,m) \geq \Omega(\frac{nm}{\log_2 n})$. When $n = 2^{cm}$ for any $c \in (0,1)$, this lower bound simplifies to $\Omega(\frac{n}{c})$, and we show a matching upper bound $g(n,m) \leq O(\frac{n}{c}\log_2(\frac{1}{c}))$ that is optimal up to a factor of $\log_2(\frac{1}{c})$. We also compute $g(n,m)$ exactly when $n \geq 2^{m-1} - O(2^{\frac{m}{2}})$.Comment: 12 pages, 4 figures. Accepted to SIAM Journal on Discrete Mathematics (SIDMA
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For a fixed M x N integer lattice L(M,N), we consider the maximum size of a subset A of L(M,N) whic...
AbstractDefine λ(n) to be the largest integer such that for each set A of size n and cover J of A, t...
We propose and study the following problem: given $X \subset Z_n$, construct a maximum packing of $d...
In extremal set theory our usual goal is to find the maximal size of a family of subsets of an $n$-e...
AbstractLet X be a maximal set of pairwise disjoint partitions of n into t distinct parts. Let Mt(n)...
Abstract. For a rational number r> 1, a set A of positive integers is called an r-multiple-free s...
Xiang, QingThe research of this thesis lies in the area of extremal combinatorics. The word "extrema...
AbstractMany problems in extremal set theory can be formulated as finding the largest set system (or...
AbstractA multiset M is a finite set consisting of several different kinds of elements, and an antic...
Let M be a set of positive integers. A set S of nonnegative integers is called an M‐set if a and b∈S...
The focus of this dissertation is on two problems in extremal set theory, which is a branch of extre...
AbstractSuppose Kv is the complete undirected graph with v vertices and G is a finite simple undirec...
Extremal combinatorics is one of the central branches of discrete mathematics. It focuses on determi...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractWe determine the maximum size of a family of subsets in {1, 2,…, n} with the property that i...
For a fixed M x N integer lattice L(M,N), we consider the maximum size of a subset A of L(M,N) whic...
AbstractDefine λ(n) to be the largest integer such that for each set A of size n and cover J of A, t...
We propose and study the following problem: given $X \subset Z_n$, construct a maximum packing of $d...