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The Geometry of Polynomial Representations

Arthur Bik, Jan Draisma, Rob H. Eggermont, Andrew Snowden

2022International Mathematics Research Notices21 citationsDOIOpen Access PDF

Abstract

Abstract We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an action of the infinite general linear group under which the coordinate ring forms a polynomial representation. Such varieties have been used to study asymptotic properties of invariants like strength and tensor rank and played a key role in two recent proofs of Stillman’s conjecture. We initiate a systematic study of $\textbf {GL}$-varieties and establish a number of foundational results about them. For example, we prove a version of Chevalley’s theorem on constructible sets in this setting.

Topics & Concepts

MathematicsVariety (cybernetics)Mathematical proofRank (graph theory)Algebraic geometryConjecturePolynomial ringAlgebra over a fieldAlgebraic varietyPure mathematicsAffine varietyPolynomialAction (physics)Representation (politics)Algebraic numberCombinatoricsGeometryMathematical analysisAffine transformationPhysicsStatisticsPolitical sciencePoliticsLawQuantum mechanicsAlgebraic Geometry and Number TheoryPolynomial and algebraic computationTensor decomposition and applications
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