Author:
Blatter Andreas,Draisma Jan,Ventura Emanuele
Abstract
AbstractIn earlier work, the second author showed that a closed subset of a polynomial functor can always be defined by finitely many polynomial equations. In follow-up work on $${\text {GL}}_\infty $$
GL
∞
-varieties, Bik–Draisma–Eggermont–Snowden showed, among other things, that in characteristic zero every such closed subset is the image of a morphism whose domain is the product of a finite-dimensional affine variety and a polynomial functor. In this paper, we show that both results can be made algorithmic: there exists an algorithm $$\textbf{implicitise}$$
implicitise
that takes as input a morphism into a polynomial functor and outputs finitely many equations defining the closure of the image; and an algorithm $$\textbf{parameterise}$$
parameterise
that takes as input a finite set of equations defining a closed subset of a polynomial functor and outputs a morphism whose image is that closed subset.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Theory and Mathematics,Computational Mathematics,Analysis
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