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On the distance from permutations to imprimitive groups for a fixed system of imprimitivity
-
B. A. Pogorelov
and
M. A. Pudovkina
Published/Copyright:
July 23, 2014
Abstract
The distance from permutations of degree n = wr to the wreath product 
with a fixed system of imprimitivity is investigated. In a number of cases, the value of the maximum distance is determined and the sets of the most distant permutations are described
Keywords : System of imprimitivity; linear structure; metric space; distance between a permutation and an imprimitive group; wreath product
Published Online: 2014-7-23
Published in Print: 2014-4-1
© 2014 by Walter de Gruyter Berlin/Boston
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- Limit theorems for the generalized size of epidemic in a Markov model with immunization
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Keywords for this article
System of imprimitivity;
linear structure;
metric space;
distance between a permutation and an imprimitive group;
wreath product
Articles in the same Issue
- Masthead
- On the existence and the number of stationary points of discrete logarithm to a base other than a primitive root
- Limit theorems for the generalized size of epidemic in a Markov model with immunization
- A biological problem and generalized allocation scheme
- On the distance from permutations to imprimitive groups for a fixed system of imprimitivity
- Carpets on simple 4-contours on the hyperbolic plane of positive curvature
