This is a collection of examples in Commutative Algebra I find noteworthy or in some other way interesting. I will try to make them more or less user-friendly, and to include references to my commalg notes whenever possible, but I offer you no promises.
Assorted Rings and Ideals
Polynomial Rings as Graded rings, and some ideals.
- The ring is a graded ring, with grading given by total degree. The homogeneous elements are homogeneous polynomials (polynomials where the total degree of each term is the same).
- The ideal is a homogeneous, prime, and maximal ideal. It is also the irrelevent ideal.
- The ideal is homogeneous.
- The ideal is not homogeneous. It cannot be generated by homogeneous elements. The same is true of for any .