Multivariate polynomial ring over a field: Difference between revisions

Definition

The multivariate polynomial ring over a field is defined as a polynomial ring in (finitely) many variables over a field. If we denote the underlying field by ${\displaystyle k}$, and the variables by ${\displaystyle x_{1},x_{2},\ldots ,x_{n}}$, then the polynomial ring is denoted ${\displaystyle k[x_{1},x_{2},\ldots ,x_{n}]}$.

Properties

The multivariate polynomial ring over a field is a unique factorization domain as well as a Noetherian domain. When there is more than one variable, it is not a Euclidean domain or a principal ideal domain.

Extra structure

Further information: multivariate polynomial ring#extra structure

The multivariate polynomial ring ${\displaystyle k[x_{1},x_{2},\ldots ,x_{n}]}$ can be viewed as a ${\displaystyle k}$-algebra. It also has the following additional structures:

• Graded ring structure: In particular, it is a graded ${\displaystyle k}$-algebra where the ${\displaystyle d^{th}}$ component is the vector space generated by monomials of degree ${\displaystyle d}$
• Filtered ring structure: In particular, it is a filtered ${\displaystyle k}$-algebra where the ${\displaystyle d^{th}}$ filtration is the subspace of polynomials of degree at most ${\displaystyle d}$

Ideals and quotients

Quotients of the polynomial ring in ${\displaystyle n}$ variables, are precisely the same as algebras generated by ${\displaystyle n}$ elements as ${\displaystyle k}$-algebras. The structure of these is in general fairly complicated.

Spectrum

Further information: Spectrum of multivariate polynomial ring over a field, spectrum of multivariate polynomial ring over an algebraically closed field

Max-spectrum

Further information: Max-spectrum of multivariate polynomial ring over a field, max-spectrum of multivariate polynomial ring over an algebraically closed field