Partial Diallel Cross Block Designs For GCA Effect |
Choi, Kuey-Chung
(Dept. of Computer & Statistics, Chosun University)
Lee, Jung-Hwa (Dept. of Computer Science & Statistics, Graduate School, Chosun University) |
1 |
Confounding in asymmetric factorial experiments
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2 |
On optimality of some partial diallel cross designs
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3 |
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DOI ScienceOn |
4 |
Optimal complete diallel crosses
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DOI ScienceOn |
5 |
Analysis of binary number association scheme partially balanced designs
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DOI ScienceOn |
6 |
Analysis of partial diallel crosses in incomplete blocks
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DOI ScienceOn |
7 |
Optimal block designs for diallel crosses
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DOI ScienceOn |
8 |
On constructions of optimal complete diallel crosses
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9 |
Generaing generalized cyclic designs with factorial balance
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DOI ScienceOn |
10 |
A generalization of partially balanced incomplete block designs
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DOI ScienceOn |
11 |
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12 |
Two classes of group divisible block designs
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13 |
Universally optimal block designs for diallel crosses
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14 |
Nested balanced incomplete block designs
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DOI |
15 |
Analysis of PBIB designs using association matrices
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DOI |
16 |
Extended group divisible partially balanced incomplete block designs
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17 |
Optimal partial diallel crosses
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DOI ScienceOn |
18 |
Two associate class partially balanced incomplete block designs and partial diallel crosses
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19 |
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20 |
concepts of general and specific combining ability in relation to diallel crossing systems
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DOI |
21 |
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22 |
Balanced incomplete block diallel cross design
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