Riccardo Aragona, Roberto Civino, Norberto Gavioli, Carlo Maria Scoppola
Published 2020-08-31Version 1
On the basis of an initial interest in symmetric cryptography, in the present work we study a chain of subgroups. Starting from a Sylow $2$-subgroup of AGL(2,n), each term of the chain is defined as the normalizer of the previous one in the symmetric group on $2^n$ letters. Partial results and computational experiments lead us to conjecture that, for large values of $n$, the index of a normalizer in the consecutive one does not depend on $n$. Indeed, there is a strong evidence that the sequence of the logarithms of such indices is the one of the partial sums of the numbers of partitions into at least two distinct parts.
Normal coverings and pairwise generation of finite alternating and symmetric groups
Normalizers of sets of components in fusion systems
Sets of universal sequences for the symmetric group and analogous semigroups
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