An LRHTS(v) (or LARHTS(v)) is a collection of {(X, Bi) : 1≤i ≤ 4(v - 2)}, where X is a v-set, each (X, Bi) is a resolvable (or almost resolvable) HTS(v), and all Bis form a partition of all cycle tr...An LRHTS(v) (or LARHTS(v)) is a collection of {(X, Bi) : 1≤i ≤ 4(v - 2)}, where X is a v-set, each (X, Bi) is a resolvable (or almost resolvable) HTS(v), and all Bis form a partition of all cycle triples and transitive triples on X. An OLRHTS(v) (or OLARHTS(v)) is a collection {(Y/{y}, Ay^j) : y ∈ Y,j = 0, 1, 2, 3}, where Y is a (v + 1)-set, each (Y/{y}, Ay^j) is a resolvable (or almost resolvable) HTS(v), and all Ay^js form a partition of all cycle and transitive triples on Y. In this paper, we establish some directed and recursive constructions for LRHTS(v), LARHTS(v), OLRHTS(v), OLARHTS(v) and give some new results.展开更多
基金Supported by the National Natural Science Foundation of China(Grant No.11471096)
文摘An LRHTS(v) (or LARHTS(v)) is a collection of {(X, Bi) : 1≤i ≤ 4(v - 2)}, where X is a v-set, each (X, Bi) is a resolvable (or almost resolvable) HTS(v), and all Bis form a partition of all cycle triples and transitive triples on X. An OLRHTS(v) (or OLARHTS(v)) is a collection {(Y/{y}, Ay^j) : y ∈ Y,j = 0, 1, 2, 3}, where Y is a (v + 1)-set, each (Y/{y}, Ay^j) is a resolvable (or almost resolvable) HTS(v), and all Ay^js form a partition of all cycle and transitive triples on Y. In this paper, we establish some directed and recursive constructions for LRHTS(v), LARHTS(v), OLRHTS(v), OLARHTS(v) and give some new results.
