σ-properties of finite groups in polynomial time
Abstract
Let H, K be subgroups of the permutation group G of degree n with K G and σ be a partition of the set of all different prime divisors of |G/K|. We prove that in polynomial time (in n) one can check G/K for σ-nilpotency and σ-solubility; H/K for σ-subnormality and σ-p-permutability in G/K. Moreover one can find the least partition σ of π(G/K) for which G/K is σ-nilpotent. Also one can find the least partition σ of π(G/K) for which H/K is σ-p-permutable in G/K.
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