Communications in Statistics - Theory and Methods ( IF 0.8 ) Pub Date : 2021-06-30 , DOI: 10.1080/03610926.2021.1942049 Shyam Saurabh 1 , Kishore Sinha 2 , Mithilesh Kumar Singh 1
Abstract
Kageyama (1972 Kageyama, S. 1972. A survey of resolvable solutions of balanced incomplete block designs. International Statistical Review 40 (3):269–73. doi: 10.2307/1402466.[Crossref], [Web of Science ®] , [Google Scholar]) presented a survey of resolvable solutions of balanced incomplete block designs. Clatworthy (1973 Clatworthy, W. H. 1973. Tables of two–associate–class partially balanced designs. Washington, DC: National Bureau of Standards. [Google Scholar]) produced tables of two associate classes partially balanced designs in the practical range of r, k ≤ 10 and presented resolvable solutions whenever possible. Here, the minimum α (≤1) – resolvable solutions of partially balanced designs not found in Clatworthy (1973 Clatworthy, W. H. 1973. Tables of two–associate–class partially balanced designs. Washington, DC: National Bureau of Standards. [Google Scholar]) and Saurabh and Sinha (2020 Saurabh, S., and K. Sinha. 2020. Some new resolvable group divisible designs. Communications in Statistics – Theory and Methods. Advance online publication. doi: 10.1080/03610926.2020.1817487.[Taylor & Francis Online], [Web of Science ®] , [Google Scholar]) are presented. This paper is in sequel to the paper by Saurabh and Sinha (2020 Saurabh, S., and K. Sinha. 2020. Some new resolvable group divisible designs. Communications in Statistics – Theory and Methods. Advance online publication. doi: 10.1080/03610926.2020.1817487.[Taylor & Francis Online], [Web of Science ®] , [Google Scholar]).
中文翻译:
部分平衡设计的可解解的调查
摘要
影山 ( 1972 影山,S. 1972。平衡不完全区组设计的可解解的调查。国际统计评论40 (3): 269 – 73。内政部:10.2307/1402466。[Crossref]、[Web of Science®] 、[Google Scholar])介绍了平衡不完全区组设计的可解析解的调查。克拉特沃西 (1973 克拉特沃西,WH 1973 年。双关联类部分平衡设计表。华盛顿特区:国家标准局。 [Google Scholar] ) 在 r, k ≤ 10 的实际范围内制作了两个关联类部分平衡设计的表格,并尽可能提供了可解决的解决方案。这里,最小 α (≤1) – 在 Clatworthy (1973 克拉特沃西,WH 1973 年。双关联类部分平衡设计表。华盛顿特区:国家标准局。 [谷歌学术搜索] ) 和 Saurabh 和 Sinha (2020 Saurabh, S.和K. Sinha。2020 年。一些新的可分解组可分设计。统计通信——理论与方法。提前在线发布。内政部:10.1080/03610926.2020.1817487。[Taylor & Francis Online]、[Web of Science®] 、[Google Scholar])。本文是 Saurabh 和 Sinha 的论文(2020 Saurabh, S.和K. Sinha。2020 年。一些新的可分解组可分设计。统计通信——理论与方法。提前在线发布。内政部:10.1080/03610926.2020.1817487。[Taylor & Francis Online]、[Web of Science®] 、[Google Scholar])。