nLab polynomial function

Context

Algebra

Definition

In commutative rings

Without scalar coefficients

Let $R$ be a commutative ring. A polynomial function is a a function $f:R \to R$ such that

$f$ is in the image of the function $j:R^* \to (R \to R)$ from the free monoid $R^*$ on $R$ , i.e. the set of lists of elements in $R$ , to the function algebra $R \to R$ , such that
- $j(\epsilon) = 0$ , where $0$ is the zero function.
- for all $a \in R^*$ and $b \in R^*$ , $j(a b) = j(a) + j(b) \cdot (-)^{\mathrm{len}(a)}$ , where $(-)^n$ is the $n$ -th power function for $n \in \mathbb{N}$
- for all $r \in R$ , $j(r) = c_r$ , where $c_r$ is the constant function whose value is always $r$ .
$f$ is in the image of the canonical ring homomorphism $i:R[x] \to (R \to R)$ from the polynomial ring in one indeterminant $R[x]$ to the function algebra $R \to R$ , which takes constant polynomials in $R[x]$ to constant functions in $R \to R$ and the indeterminant $x$ in $R[x]$ to the identity function $\mathrm{id}_R$ in $R \to R$

With scalar coefficients

For a commutative ring $R$ , a polynomial function is a function $f:R \to R$ with a natural number $n \in \mathbb{N}$ and a function $a:[0, n] \to R$ from the set of natural numbers less than or equal to $n$ to $R$ , such that for all $x \in R$ ,

f(x) = \sum_{i:[0, n]} a(i) \cdot x^i

where $x^i$ is the $i$ -th power function for multiplication.

In non-commutative algebras

For a commutative ring $R$ and a $R$ -non-commutative algebra $A$ , a $R$ -polynomial function is a function $f:A \to A$ with a natural number $n \in \mathbb{N}$ and a function $a:[0, n] \to R$ from the set of natural numbers less than or equal to $n$ to $R$ , such that for all $x \in A$ ,

f(x) = \sum_{i:[0, n]} a(i) x^i

where $x^i$ is the $i$ -th power function for the (non-commutative) multiplication.

References

Wikipedia, Polynomial function

nLab polynomial function

Context

Algebra

Group theory

Ring theory

Module theory

Gebras

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