Factorizations of simple groups of order 168 and 360
Abstract
A finite group G is called k-factorizable if for any factorization |G|=a1·s ak with ai>1 there exist subsets Ai of G with |Ai|=ai such that G=A1·s Ak. We say that G is multifold-factorizable if G is k-factorizable for any possible integer k≥2. We prove that simple groups of orders 168 and 360 are multifold-factorizable and formulate two conjectures that the symmetric group Sn for any n and the alternative group An for n≥6 are multifold-factorizable.
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