A (v, k, λ) difference family ((v, k, λ)-DF in short) over an abelian group G of order v, is a collection F=(Bi|i ∈ I} of k-subsets of G, called base blocks, such that any nonzero element of G can be repres...A (v, k, λ) difference family ((v, k, λ)-DF in short) over an abelian group G of order v, is a collection F=(Bi|i ∈ I} of k-subsets of G, called base blocks, such that any nonzero element of G can be represented in precisely A ways as a difference of two elements lying in some base blocks in F. A (v, k, λ)-DDF is a difference family with disjoint blocks. In this paper, by using Weil's theorem on character sum estimates, it is proved that there exists a (p^n, 4, 1)-DDF, where p = 1 (rood 12) is a prime number and n ≥1.展开更多
基金Supported by the National Natural Science Foundation of China(No.10561002)Guangxi Science Foundation(No.0640062)Innovation Project of Guangxi Graduate Education.
文摘A (v, k, λ) difference family ((v, k, λ)-DF in short) over an abelian group G of order v, is a collection F=(Bi|i ∈ I} of k-subsets of G, called base blocks, such that any nonzero element of G can be represented in precisely A ways as a difference of two elements lying in some base blocks in F. A (v, k, λ)-DDF is a difference family with disjoint blocks. In this paper, by using Weil's theorem on character sum estimates, it is proved that there exists a (p^n, 4, 1)-DDF, where p = 1 (rood 12) is a prime number and n ≥1.
