Describing Multivariate Polynomial Subalgebras Using Equations
Abstract
Let K be an algebraically closed field, and A ⊂ K[x1, …, xn] be a subalgebra of finite codimension. It is known that there exists a (not necessarily unique) finite filtration of K-algebras \[ A = A0 ⊂ A1 ⊂ … ⊂ Am = K[x1, …, xn], \] where each Ai can be written as the kernel of some linear functional Li + 1 : Ai + 1 K, and each Li is either a derivation or of the form Li : f c(f(α) - f(β)) for some α, β ∈ Kn and c ∈ K. We investigate the structure of these filtrations and linear functionals. Our main result shows that each such Li which is a derivation may be written as a linear combination of partial derivatives evaluated at points of Kn.
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