The Answers to a Problem and Two Conjectures about OD-Characterization of Finite Groups

Abstract

In [Akbari and Moghaddamfar, Recognizing by order and degree pattern of some projective special linear groups, Internat. J. Algebra Comput., 2012] the authors possed the following problem: \\ Problem. Is there a simple group which is k-fold OD-characterizable for k≥3\ ? In this paper as the main result we give positive answer to the above problem and we introduce two simple groups which are k-fold OD-characterizable such that k≥6. Also in [R. Kogani-Moghadam and A. R. Moghaddamfar, Groups with the same order and degree pattern, Science China Mathematics, 2012], the authors possed two conjectures as follows: \\ Conjecture 1. All alternating groups Am with m = 10 are OD-characterizable. \\ Conjecture 2. All symmetric groups Sm, with m = 10, are n-fold OD-characterizable, where n∈\1, 3\. In this paper we find some alternating and some symmetric groups such that these conjectures are not true for them.