Naringenin 7-O-methyltransferase

In mathematics, the ring of polynomial functions on a vector space gives a coordinate-free analog of a polynomial ring. It can be motivated as follows. If ${\displaystyle S=R[t_1,\dots ,t_n]}$, then, as the notation suggests, we can view ${\displaystyle t_i}$ as coordinate functions on ${\displaystyle R^n}$: ${\displaystyle t_i(x)=x_i}$ when ${\displaystyle x=(x_1,\dots ,x_n).}$ This suggests the following: let V be a finite-dimensional vector space over an infinite field k and then let S be the subring generated by the dual space ${\displaystyle V^{*}}$ of the ring of functions ${\displaystyle V\to k}$. If we fix a basis for V and write ${\displaystyle t_i}$ for its dual basis, then S consists of polynomials in ${\displaystyle t_i}$; S can be viewed as a polynomial ring over k. If V is viewed as an algebraic variety, then this S is precisely the coordinate ring of V.

See also

• Algebraic geometry of projective spaces
• Symmetric algebra
• Zariski tangent space

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