Multipliers of disposition p-groups
Abstract
Let p be a prime number and c, d natural numbers. Up to isomorphism, there is a unique p-group Gcd of least order with rank d and nilpotency class c named disposition group. This group plays an important role in the construction of Galois extensions over number fields with given p-group as Galois group. Also, it has a central series with all factors being elementary. Since Gc1 is abelian we consider d≥ 2. In this article, first, we determine the order of all its subgroups of lower central series and n-th center subgroups of Gcd, (n∈ N). Then we deduce these groups are n- capable. Also, the structure of the m-nilpotent multiplier of Gcd is determined in two cases m≥ c and m≤ c. Finally, polynilpotent multiplier of disposition group of class row (m1,m2,…,mt), when m1≤ c is calculated.
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