Finite groups with some restriction on the vanishing set
Abstract
Let x be an element of a finite group G and denote the order of x by ord(x) . We consider a finite group G such that (ord(x),ord(y))≤slant 2 for any two vanishing elements x and y contained in distinct conjugacy classes. We show that such a group G is solvable. When G with the property above is supersolvable, we show that G has a normal metabelian 2 -complement.
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