Normal $2$-coverings of the finite simple groups and their generalizations

Abstract: Given a finite group G, we say that G has weak normal covering number γw(G) if γw(G) is the smallest integer with G admitting proper subgroups H 1 , . . . , H γw (G) such that each element of G has a conjugate in H i , for some i ∈ {1, . . . , γw(G)}, via an element in the automorphism group of G.We prove that the weak normal covering number of every non-abelian simple group is at least 2 and we classify the non-abelian simple groups attaining 2. As an application, we classify the non-abelian simple groups hav… Show more