Trends and lines of development in scheme theory
From MaRDI portal
Publication:1039426
DOI10.1016/j.ejc.2008.11.003zbMath1228.05322OpenAlexW2018470341MaRDI QIDQ1039426
Publication date: 30 November 2009
Published in: European Journal of Combinatorics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ejc.2008.11.003
Related Items (5)
On a Class of Non-commutative Imprimitive Association Schemes of Rank 6 ⋮ Association schemes in which the thin residue is a finite cyclic group ⋮ Cartan coherent configurations ⋮ Commutative association schemes ⋮ A Schur-Zassenhaus theorem for association schemes
Cites Work
- On projective and affine planes with transitive collineation groups
- On association schemes all elements of which have valency 1 or 2
- Commutativity of association schemes of prime square order having non-trivial thin closed subsets
- Representations of finite association schemes
- Buildings of spherical type and finite BN-pairs
- Coherent configurations. I: Ordinary representation theory
- Association schemes generated by a non-symmetric relation of valency 2
- Basic structure theory of association schemes
- Sufficient conditions for a scheme to originate from a group
- Sylow theory for table algebras, fusion rule algebras, and hypergroups.
- On meta-thin association schemes
- Locality of a modular adjacency algebra of an association scheme of prime power order
- A generalization of Sylow's theorems on finite groups to association schemes
- Homogeneous coherent configurations as generalized groups and their relationship to buildings
- The exchange condition for association schemes
- Solvability of groups of odd order
- Algebraic structure of association schemes of prime order
- Central elements in core-free groups
- Characters of association schemes containing a strongly normal closed subset of prime index
- Theory of Association Schemes
- On quasi-thin association schemes
- On quasi-thin association schemes with odd number of points
This page was built for publication: Trends and lines of development in scheme theory
