Polynomial ring over a field/One variable/Principal ideal domain/Fact/Proof

Proof

Let denote an ideal in different from . We consider the non-empty set of natural numbers

This set has a minimum . This number arises from an element , , . We claim that .

The inclusion is clear. To prove the other inclusion , let be given. Due to fact, we have

Because of and the minimality of , the first case can not happen. Therefore, , and this means that is a multiple of .