On the Order of Nilpotent Multipliers of Finite p-Groups

Abstract

Let G be a finite p-group of order pn. YA. G. Berkovich (Journal of Algebra 144, 269-272 (1991)) proved that G is elementary abelian p-group if and only if the order of its Schur multiplier, M(G), is at the maximum case. In this paper, first we find the upper bound pc+1(n) for the order the c-nilpotent multiplier of G, M(c)(G), where c+1(i) is the number of basic commutators of weight c+1 on i letters. Second, we obtain the structure of G, in abelian case, where |M(c)(G)|=pc+1(n-t), for all 0≤ t≤ n-1. Finally, by putting a condition on the kernel of the left natural map of the generalized Stallings-Stammbach five term exact sequence, we show that an arbitrary finite p-group with the c-nilpotent multiplier of maximum order is an elementary abelian p-group.