Answer to Question #146436 in Abstract Algebra for J

For the abelian groups of order 36 :

"36=2^2 3^2"

We will try to decompose this group into a product and using the Chinese remainder theorem to regroup all the possible decompositions.

So there are forcefully elements of order 2 and 3 respectively. Now there are different cases :

1. There are elements of order 4 and 9. In this case their product gives un an element of order 36 and thus "G\\simeq \\mathbb{Z}\/36\\mathbb{Z}"
2. There is an element of order 4, but no element of order 9. Therefore there is an element of order 18 (say "g") and an element of order 2 which is not in "<g>" (due to cardinality reasons). Therefore we can decompose "G" in a direct product : "G\\simeq \\mathbb{Z}\/18\\mathbb{Z} \\times \\mathbb{Z}\/2\\mathbb{Z}" .
3. There is an element of order 9, but no element of order 4. This case is completely symmetrical and we have a product "G \\simeq \\mathbb{Z}\/12\\mathbb{Z}\\times\\mathbb{Z}\/3\\mathbb{Z}" .
4. If there is no element of order 4 or 9, we still have an element of order 6 (by multiplying the elements of order 2 and 3), say "g" , and there is another element of order 6 which is not in "<g>" Therefore our product is "G\\simeq (\\mathbb{Z}\/6\\mathbb{Z})^2"

For abelian groups of order "54=2\\cdot3^3" we have essentially the same algorithm:

There are forcefully the elements of order 2 and 3. Now there are cases:

1. There is an element of order 27. In this case the product of elements of order 2 and 27 will give an element of order 54 and thus "G\\simeq\\mathbb{Z}\/54\\mathbb{Z}" .
2. There is no element of order 27, but there is an element of order 9. In this case there is an element of order 18, say "g" and there is an element of order 3 that is not in "<g>" . Thus we can decompose "G\\simeq \\mathbb{Z}\/2\\mathbb{Z}\\times (\\mathbb{Z}\/9\\mathbb{Z}\\times\\mathbb{Z}\/3\\mathbb{Z}) \\simeq \\mathbb{Z}\/18\\mathbb{Z} \\times \\mathbb{Z}\/3\\mathbb{Z}" .
3. There are no elements of order 9. In this case there is an element of order 6, we decompose "G" into a product "G\\simeq \\mathbb{Z}\/6\\mathbb{Z} \\times H" for "H" a group of cardinal 9 without any element of order 9, so this is "(\\mathbb{Z}\/3\\mathbb{Z})^2" . Therefore we have "G\\simeq \\mathbb{Z}\/6\\mathbb{Z}\\times (\\mathbb{Z}\/3\\mathbb{Z})^2" .