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JCT
2006
2006
On the coexistence of conference matrices and near resolvable 2-(2k+1, k, k-1) designs
We show that a near resolvable 2-(2k + 1, k, k - 1) design exists if and only if a conference matrix of order 2k + 2 does. A known result on conference matrices then allows us to conclude that a near resolvable 2-(2k + 1, k, k - 1) design with even k can only exist if 2k + 1 is the sum of two squares. In particular, neither a near resolvable 2-(21, 10, 9) design nor does a near resolvable 2-(33, 16, 15) design exist. For k 14, we also enumerate the near resolvable 2-(2k + 1, k, k - 1) designs and the corresponding conference matrices.
Real-time Traffic| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | JCT |
| Authors | Malcolm Greig, Harri Haanpää, Petteri Kaski |
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