Certain locally nilpotent varieties of groups
Abstract
Let c≥ 0, d≥ 2 be integers and Nc(d) be the variety of groups in which every d-generator subgroup is nilpotent of class at most c. N.D. Gupta posed this question that for what values of c and d it is true that Nc(d) is locally nilpotent? We prove that if c≤ 2d+2d-1-3 then the variety Nc(d) is locally nilpotent and we reduce the question of Gupta about the periodic groups in Nc(d) to the prime power finite exponent groups in this variety.
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