Let m� n be positive integers and � be a class of groups. We say that a group G satisfies the condition ��m� n�, if for every two subsets M and N of cardinalities m and n, respectively, there exist x ∈ M and y ∈ N such that �x� y� ∈ �. In this article, we study groups G satisfies the condition ��m� n�, where � is the class of nilpotent groups. We conjecture that every infinite ��m� n�-group is weakly nilpotent (i.e., every two generated subgroup of G is nilpotent). We prove that if G is a finite non-soluble group satisfies the condition ��m� n�, then �G� ≤ max�m� n�c2max�m�n�2 �logmax�m�n� 60 �!, for some constant c (in fact c ≤ max�m� n�). We give a sufficient condition for solubility, by proving that a ��m� n�-group is a soluble group whenever m +n < 59. We also prove the bound 59 cannot be improved and indeed the equality for a nonsoluble group G holds if and only if G � A5, the alternating group of degree 5.
