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Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7< 5<3, is a special order defined upon the positive integers, which represent periods of orbits. This sequence has been recently extended to 1 < 2 < 4 < 7 < 5 < 3 <4e < 5e < ... where ne- represents the period of one typical and different n-periodic orbit. Our principal result is an extension of this new sequence, in which we inserted, between any two of its periods, except among the harmonics 1 < 2 < 4 < ... < 2k , infinitely many sequences of new orbit\'s periods