Pseudo Frobenius numbers
Abstract
For a prime p, we call a positive integer n a Frobenius p-number if there exists a finite group with exactly n subgroups of order pa for some a 0. Extending previous results on Sylow's theorem, we prove in this paper that every Frobenius p-number n 1p2 is a Sylow p-number, i.e., the number of Sylow p-subgroups of some finite group. As a consequence, we verify that 46 is a pseudo Frobenius 3-number, that is, no finite group has exactly 46 subgroups of order 3a for any a 0.
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