The Number of Finite Groups Whose Element Orders is Given
Abstract
The spectrum ω(G) of a finite group G is the set of element orders of G. If is a non-empty subset of the set of natural numbers, h() stands for the number of isomorphism classes of finite groups G with ω(G)= and put h(G)=h(ω(G)). We say that G is recognizable (by spectrum ω(G)) if h(G)=1. The group G is almost recognizable (resp. nonrecognizable) if 1<h(G)<∞ (resp. h(G)=∞). In the present paper, we focus our attention on the projective general linear groups PGL(2,pn), where p=2α 3β+1 is a prime, α ≥ 0, β ≥ 0 and n≥ 1, and we show that these groups cannot be almost recognizable, in other words h(PGL(2,pn))∈ \1, ∞\. It is also shown that the projective general linear groups PGL(2,7) and PGL(2,9) are nonrecognizable. In this paper a computer program has also been presented in order to find out the primitive prime divisors of an-1.
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