On the Subgroup Distance Problem in Cyclic Permutation Groups
Abstract
We show that the Subgroup distance problem regarding the Hamming distance, the Cayley distance and the l∞ distance is NP-complete when the input group is cyclic. When we restrict the l∞ distance to fixed values we show that it is NP-complete to decide whether there are numbers z1,z2 ∈ N such that l∞(β, α1z1α2z2) ≤ 1 for permutation α1,α2,β ∈ Sn where α1 and α2 commute. However on the positive side we can show that it can be decided in NL whether there is a number z ∈ N such that l∞(β, αz) ≤ 1 for permutations α,β ∈ Sn. For the former we provide a tool, namely for all numbers t1,t2,t ∈ N where t is required to be odd, 0 ≤ t1 < t2 < t and t1 t2 q for all primes q t we give a constructive proof for the existence of permutations α,β ∈ St with l∞(β, αt1) ≤ 1 and l∞(β, αt2) ≤ 1.
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