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COMBINATORICS
1999
1999
On Highly Closed Cellular Algebras and Highly Closed Isomorphisms
We define and study m-closed cellular algebras (coherent configurations) and m-isomorphisms of cellular algebras which can be regarded as mth approximations of Schurian algebras (i.e. the centralizer algebras of permutation groups) and of strong isomorphisms (i.e. bijections of the point sets taking one algebra to the other) respectively. If m = 1 we come to arbitrary cellular algebras and their weak isomorphisms (i.e. matrix algebra isomorphisms preserving the Hadamard multiplication). On the other hand, the algebras which are m-closed for all m 1 are exactly Schurian ones whereas the weak isomorphisms which are m-isomorphisms for all m 1 are exactly ones induced by strong isomorphisms. We show that for any m there exist m-closed algebras on O(m) points which are not Schurian and m-isomorphisms of cellular algebras on O(m) points which are not induced by strong isomorphisms. This enables us to find for any m an edge colored graph with O(m) vertices satisfying the m-vertex condition...
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| Added | 22 Dec 2010 |
| Updated | 22 Dec 2010 |
| Type | Journal |
| Year | 1999 |
| Where | COMBINATORICS |
| Authors | Sergei Evdokimov, Ilia N. Ponomarenko |
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