$CI$-property for decomposable Schur rings over an abelian group

· 2018 · math.CO · arXiv 1802.04571

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abstract

A Schur ring over a finite group is said to be decomposable if it is the generalized wreath product of Schur rings over smaller groups. In this paper we establish a sufficient condition for a decomposable Schur ring over the direct product of elementary abelian groups to be a $CI$-Schur ring. By using this condition we reprove in a short way known results on the $CI$-property for decomposable Schur rings over an elementary abelian group of rank at most $5$.

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The Cayley isomorphism property for $\mathbb{Z}_p^3 \times \mathbb{Z}_q$

math.GR · 2019-07-08 · unverdicted · novelty 6.0

Z_p^3 × Z_q is a CI-group w.r.t. binary relational structures for distinct primes p and q.

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The Cayley isomorphism property for $\mathbb{Z}_p^3 \times \mathbb{Z}_q$ math.GR · 2019-07-08 · unverdicted · none · ref 18 · internal anchor
Z_p^3 × Z_q is a CI-group w.r.t. binary relational structures for distinct primes p and q.

$CI$-property for decomposable Schur rings over an abelian group

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