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JCT
2006

On the coexistence of conference matrices and near resolvable 2-(2k+1, k, k-1) designs

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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.
Malcolm Greig, Harri Haanpää, Petteri Ka
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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