The designs considered are such that the design and its dual are symmetric affine resolvable, with u = 3k. It is proved that if one exists with k = k0, the number of non-isomorphic such designs with k = k03n tends to infinity with n. Some examples are constructed for k = 3 and 6
The affine resolvable 2-(27, 9, 4) designs were classified by Lam and Tonchev [9, 10]. We use their ...
AbstractA line of a design is the intersection of all the blocks on two points. There is an upper bo...
A line of a design is the intersection of all the blocks on two points. There is an upper bound on t...
The designs considered are such that the design and its dual are symmetric affine resolvable, with u...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
AbstractLower bouds on the number of non-isomorphic embeddings of a symmetric net into affine design...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
AbstractIt is shown that for each λ ⩾ 3, there are only finitely many quasi-residual quasi-symmetric...
The affine resolvable 2-(27, 9, 4) designs were classified by Lam and Tonchev [9, 10]. We use their ...
AbstractA line of a design is the intersection of all the blocks on two points. There is an upper bo...
A line of a design is the intersection of all the blocks on two points. There is an upper bound on t...
The designs considered are such that the design and its dual are symmetric affine resolvable, with u...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
Symmetric nets are affine resolvable designs whose duals are also affine. It is shown that. up to is...
AbstractLower bouds on the number of non-isomorphic embeddings of a symmetric net into affine design...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
Lower bouds on the number of non-isomorphic embeddings of a symmetric net into affine designs with c...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
All affine resolvable designs with parameters of the design of the hyperplanes in ternary affine 3-s...
AbstractIt is shown that for each λ ⩾ 3, there are only finitely many quasi-residual quasi-symmetric...
The affine resolvable 2-(27, 9, 4) designs were classified by Lam and Tonchev [9, 10]. We use their ...
AbstractA line of a design is the intersection of all the blocks on two points. There is an upper bo...
A line of a design is the intersection of all the blocks on two points. There is an upper bound on t...
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