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Higher algebra

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Definition

Example

The set of polynomials in one variable with coefficients in $R$ is the set $R [ℕ]$ of all formal linear combinations on elements $n \in ℕ$ , thought of as powers $x^{n}$ of the variable $x$

a_{n} z^{n} + \dots + a_{1} z + a_{0},

where $n$ is an arbitrary natural number and $a_{0}, \dots, a_{n} \in R$ , modulo the equivalence relation generated by equations of the form

0 z^{n + 1} + a_{n} z^{n} + \dots + a_{1} z + a_{0} = a_{n} z^{n} + \dots + a_{1} z + a_{0}

(so that we ignore coefficients of zero).

This set is equipped with the structure of a ring itself, in fact a commutative algebra over $R$ , denoted $R [z]$ and called the polynomial ring or ring of polynomials given by the unique bilinear map

R [z] \cdot R [z] \to R [z]

which on monomials is given by

z^{k} \cdot z^{l} = z^{k + l} .

Properties

Proposition

The polynomial ring $R [z]$ is the free $R$ -algebra on one generator (the variable $z$ ).

Proof

By the definition of free objects one needs to check that ring homomorphisms

f : R [z] \to K

to another ring K are in natural bijection with functions of sets

\bar{f} : * \to K

from the singleton to the set underlying $K$ . Take $\bar{f} ≔ f (z)$ . Using $R$ -linearity, this is directly seen to yield the desired bijection.

Remark

Similarly, the set of polynomials in any give set of variables with coefficients in $R$ is the free commutative $R$ -algebra on that set of generators; see symmetric power and symmetric algebra.

Remark

The field of fractions of $R [z]$ is the field $R (z)$ of rational functions.

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Higher algebra

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Geometry on formal duals of algebras

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Contemts

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Context

Higher algebra

Algebraic theories

Algebras and modules

Higher algebras

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Theorems

Contemts

Definition

Example

Properties

Proposition

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Remark

Remark

Related concepts

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