1 thought on “Does the change group contain the relationship between the replacement group?”
Billy
The replacement group is recognized as a replacement group on the N yuan collection, which is a limited group. The change group generally needs to be analyzed according to specific conditions. For different geometric objects, there will be corresponding transformation groups. It is not necessarily N yuan limited set, or European -style polyhedron, European space, hyperbolic space and the like. They all have corresponding transformation groups. In many cases, they will be unlimited groups. Symmetric groups generally have two meanings, one is equivalent to the replacement group, and the other
The replacement group is recognized as a replacement group on the N yuan collection, which is a limited group. The change group generally needs to be analyzed according to specific conditions. For different geometric objects, there will be corresponding transformation groups. It is not necessarily N yuan limited set, or European -style polyhedron, European space, hyperbolic space and the like. They all have corresponding transformation groups. In many cases, they will be unlimited groups. Symmetric groups generally have two meanings, one is equivalent to the replacement group, and the other