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existence of a finite group which is the union of self normalizing subgroups
Can a finite group G be the union of self normalizing subgroups such that the intersection between any two of any of these subgroups is equal to the unit of the group G? I don't think so but I can't prove it. Thank you for your help.
existence of a finite group union of self normalizing subgroups
Can a finite group G be the union of self normalizing subgroups such that the intersection between two of any of these subgroups is equal to the unit of the group G? I don't think so but I can't prove it. Thank you for your help.
existence of a finite group which is the union of self normalizing subgroups
Can a finite group G be the union of self normalizing subgroups such that the intersection between any two of these subgroups is equal to the unit of the group G? I don't think so but I can't prove it. Thank you for your help.
existence of a finite group union of self normalizing subgroups
Can a finite group G be the union of self normalizing subgroups such that the intersection between two of any of these subgroups is equal to the unit of the group G? I don't think so but I can't prove it. Thank you for your help.
