1 thought on “Related nature of replacement group”
Elmer
Theorem 1 can be exchanged when rotation is not connected Theorem 2 Each (non -rotation) replacement can be displayed as the accumulation of non -connected rotation; each rotation can be replaced. Therefore The replacement can be displayed as the replacement accumulation Theorem 3 Each replacement table of each replacement table into a replacement, the uncharacterment of the change of the number of changes
Theorem 1 can be exchanged when rotation is not connected
Theorem 2 Each (non -rotation) replacement can be displayed as the accumulation of non -connected rotation; each rotation can be replaced. Therefore The replacement can be displayed as the replacement accumulation
Theorem 3 Each replacement table of each replacement table into a replacement, the uncharacterment of the change of the number of changes