On K-Pt-subnormal subgroups of finite groups and related formations
Abstract
Let t be a fixed natural number. A subgroup H of a group G will be called K-Pt-subnormal in G if there exists a chain of subgroups H = H0 ≤ H1 ≤ ·s ≤ Hm-1 ≤ Hm = G such that either Hi-1 is normal in Hi or |Hi : Hi-1| is a some prime p and p-1 is not divisible by the (t+1)th powers of primes for every i = 1,… , n. In this work, properties of K-Pt-subnormal subgroups and classes of groups with Sylow K-Pt-subnormal subgroups are obtained.
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