AbstractThe concept of good large set of Steiner triple systems (or GLS in short) was introduced by Lu in his paper “on large sets of disjoint Steiner triple systems”, [J. Lu, On large sets of disjoint Steiner triple systems, I–III, J. Combin. Theory (A) 34 (1983) 140-182]. In this paper a doubling construction for GLSs is displayed and some existence results are obtained
AbstractWe study the large sets of generalized Kirkman systems. The purpose of introducing the struc...
A transitive triple is a collection of three ordered pairs of the form {(a, b), (b, c), (a, c)}, whe...
AbstractWe give the first known examples of 6-sparse Steiner triple systems by constructing 29 such ...
AbstractThe concept of good large set of Steiner triple systems (or GLS in short) was introduced by ...
AbstractA Steiner triple system of order v (briefly STS(v)) consists of a v-element set X and a coll...
AbstractIn a previous paper (J. Combin. Theory Ser. A 34 (1983), 156–182), to construct large sets o...
AbstractAn LR design is introduced by the second author in his recent paper and it plays a very impo...
Lu [6, 7, 8] proved that large sets of disjointS(2, 3, v) exist for allv ≡ 1 or 3 (mod 6),v ≠ 7. How...
AbstractIn this paper, the existence of large sets of Kirkman triple system is transformed to the ex...
AbstractIn this note, a construction of the large sets of pairwise disjoint Mendelsohn triple system...
This paper presents four new recursive constructions for large sets of v–1 STS(v). These facilitate ...
AbstractWe study the coloring properties of STSs and derive several inequalities for the sizes of th...
We consider the sets of all possible Steiner triple systems (STS) which can be defined on a 7-set or...
AbstractLet D(v) denote the maximum number of pairwise disjoint Steiner triple systems of order v. I...
AbstractTo construct large sets of disjoint STS(3n) (i.e., LTS(3n)), we introduce a new kind of comb...
AbstractWe study the large sets of generalized Kirkman systems. The purpose of introducing the struc...
A transitive triple is a collection of three ordered pairs of the form {(a, b), (b, c), (a, c)}, whe...
AbstractWe give the first known examples of 6-sparse Steiner triple systems by constructing 29 such ...
AbstractThe concept of good large set of Steiner triple systems (or GLS in short) was introduced by ...
AbstractA Steiner triple system of order v (briefly STS(v)) consists of a v-element set X and a coll...
AbstractIn a previous paper (J. Combin. Theory Ser. A 34 (1983), 156–182), to construct large sets o...
AbstractAn LR design is introduced by the second author in his recent paper and it plays a very impo...
Lu [6, 7, 8] proved that large sets of disjointS(2, 3, v) exist for allv ≡ 1 or 3 (mod 6),v ≠ 7. How...
AbstractIn this paper, the existence of large sets of Kirkman triple system is transformed to the ex...
AbstractIn this note, a construction of the large sets of pairwise disjoint Mendelsohn triple system...
This paper presents four new recursive constructions for large sets of v–1 STS(v). These facilitate ...
AbstractWe study the coloring properties of STSs and derive several inequalities for the sizes of th...
We consider the sets of all possible Steiner triple systems (STS) which can be defined on a 7-set or...
AbstractLet D(v) denote the maximum number of pairwise disjoint Steiner triple systems of order v. I...
AbstractTo construct large sets of disjoint STS(3n) (i.e., LTS(3n)), we introduce a new kind of comb...
AbstractWe study the large sets of generalized Kirkman systems. The purpose of introducing the struc...
A transitive triple is a collection of three ordered pairs of the form {(a, b), (b, c), (a, c)}, whe...
AbstractWe give the first known examples of 6-sparse Steiner triple systems by constructing 29 such ...
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