AbstractA set F of distinct subsets x of a finite multiset M (that is, a set with several different kinds of elements) is a c-antichain if for no c + 1 elements x0, x1, …, xc of F does x0 ⊂ x1 ⊂ ··· ⊂ xc hold. The weight of F, wF, is the total number of elements of M in the various elements x of F. For given integers f and c, we find min wF, where the minimum is taken over all f-element c-antichains F. Daykin [9, 10] has solved this problem for ordinary sets and Clements [3] has solved it for multisets, but only for c = 1
1. Every anti-chain in P has cardinality 1 =) every anti-chain in F has cardinality 1 2. There exist...
AbstractA set X of subsets of an n-element set S is called an anti-chain if no two elements of X are...
A subset $A$ of $\mathbb{Z}^n$ is called a weak antichain if it does not contain two elements $x$ an...
AbstractA set F of distinct subsets x of a finite multiset M (that is, a set with several different ...
AbstractA multiset M is a finite set consisting of several different kinds of elements, and an antic...
AbstractLet M be a finite set consisting of ki elements of type i, i = 1, 2,…, n and let S denote th...
AbstractA formula is pointed out for min |A|, where the minimum is taken over all f-element antichai...
AbstractLet 1⩽k1⩽k2⩽…⩽kn be integers and let S denote the set of all vectors x = (x1, …, xn with int...
AbstractLet S(n) denote the set of subsets of an n-element set. For an element x of S(n), let Γx and...
Let n ⩾4 be a natural number, and let K be a set K⊆[n]:={1,2,...,n}. We study the problem of finding...
We construct a special type of antichain (i. e., a family of subsets of a set, such that no subset i...
Let n> 3 be a natural number. We study the problem to find the smallest r such that there is a fa...
An (n)completely separating system C ((n)CSS) is a collection of blocks of [n] = {1,...,n} such that...
AbstractLet k1, k2,…, kn be given integers, 1 ⩽ k1 ⩽ k2 ⩽ … ⩽ kn, and let S be the set of vectors x ...
AbstractA short proof of the following result of Kleitman is given: the total number of sets contain...
1. Every anti-chain in P has cardinality 1 =) every anti-chain in F has cardinality 1 2. There exist...
AbstractA set X of subsets of an n-element set S is called an anti-chain if no two elements of X are...
A subset $A$ of $\mathbb{Z}^n$ is called a weak antichain if it does not contain two elements $x$ an...
AbstractA set F of distinct subsets x of a finite multiset M (that is, a set with several different ...
AbstractA multiset M is a finite set consisting of several different kinds of elements, and an antic...
AbstractLet M be a finite set consisting of ki elements of type i, i = 1, 2,…, n and let S denote th...
AbstractA formula is pointed out for min |A|, where the minimum is taken over all f-element antichai...
AbstractLet 1⩽k1⩽k2⩽…⩽kn be integers and let S denote the set of all vectors x = (x1, …, xn with int...
AbstractLet S(n) denote the set of subsets of an n-element set. For an element x of S(n), let Γx and...
Let n ⩾4 be a natural number, and let K be a set K⊆[n]:={1,2,...,n}. We study the problem of finding...
We construct a special type of antichain (i. e., a family of subsets of a set, such that no subset i...
Let n> 3 be a natural number. We study the problem to find the smallest r such that there is a fa...
An (n)completely separating system C ((n)CSS) is a collection of blocks of [n] = {1,...,n} such that...
AbstractLet k1, k2,…, kn be given integers, 1 ⩽ k1 ⩽ k2 ⩽ … ⩽ kn, and let S be the set of vectors x ...
AbstractA short proof of the following result of Kleitman is given: the total number of sets contain...
1. Every anti-chain in P has cardinality 1 =) every anti-chain in F has cardinality 1 2. There exist...
AbstractA set X of subsets of an n-element set S is called an anti-chain if no two elements of X are...
A subset $A$ of $\mathbb{Z}^n$ is called a weak antichain if it does not contain two elements $x$ an...