Improved unirationality for GL-varieties
Pith reviewed 2026-06-28 08:23 UTC · model grok-4.3
The pith
Irreducible GL-varieties admit surjective GL-equivariant maps from a simple product model rather than only dominant maps.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
If an irreducible GL-variety satisfies the hypotheses of the unirationality theorem, then there exists a surjective GL-equivariant morphism from the product of an irreducible finite-dimensional variety with trivial GL-action and an infinite-dimensional affine space with linear GL-action onto the given GL-variety. This replaces the merely dominant map of the earlier theorem. As an immediate consequence, secant varieties to varieties of tensors are images of GL-equivariant maps.
What carries the argument
The surjective GL-equivariant morphism from the product of an irreducible finite-dimensional variety with trivial action and an infinite-dimensional affine space with linear action.
Load-bearing premise
The GL-variety must be irreducible and satisfy the hypotheses under which the earlier unirationality theorem supplies a dominant map.
What would settle it
An explicit irreducible GL-variety equipped with a point that lies outside the image of every GL-equivariant map from the product of a finite-dimensional irreducible variety with trivial action and an infinite-dimensional affine space with linear action.
read the original abstract
A $\mathbf{GL}$-variety is a typically infinite dimensional variety equipped with a suitable action of the infinite general linear group $\mathbf{GL}$. In earlier work, we established the unirationality theorem: an irreducible $\mathbf{GL}$-variety admits a dominant map from a particularly simple $\mathbf{GL}$-variety, namely, the product of an irreducible finite-dimensional variety with trivial $\mathbf{GL}$-action and an infinite-dimensional affine space on which $\mathbf{GL}$ acts linearly. The main result of this paper states that this map can in fact be constructed to be surjective rather than merely dominant. An immediate application is that secant varieties to varieties of tensors, which are typically constructed as image closures of certain $\mathbf{GL}$-equivariant maps, are in fact also images of (more complicated) $\mathbf{GL}$-equivariant maps. We derive several consequences of this improved unirationality theorem.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript improves the unirationality theorem for irreducible GL-varieties: under the same hypotheses as the prior result (which produced a dominant GL-equivariant map), there exists a surjective GL-equivariant map from the product of an irreducible finite-dimensional variety with trivial GL-action and an infinite-dimensional affine space with linear GL-action. The paper supplies an explicit modification of the earlier construction to achieve surjectivity while preserving equivariance, applies the result to show that secant varieties of tensor varieties are images (not merely closures of images) of such maps, and derives several consequences.
Significance. If the central construction holds, the result strengthens the geometric understanding of GL-varieties by replacing dominance with surjectivity, which is a meaningful improvement for applications such as the geometry of secant varieties. The explicit modification and direct consequences for tensor secants constitute a clear technical advance within the existing framework.
minor comments (1)
- The abstract and introduction would benefit from a brief pointer to the precise section containing the modified construction that upgrades dominance to surjectivity.
Simulated Author's Rebuttal
We thank the referee for their positive summary of the manuscript and for recommending acceptance. The report accurately captures the main result and its applications.
Circularity Check
Minor self-citation to prior dominant-map theorem; new surjectivity construction is independent
full rationale
The paper cites the authors' earlier unirationality theorem (providing a dominant GL-equivariant map) and supplies an explicit modification of that construction to achieve surjectivity while preserving equivariance and the same hypotheses on the target GL-variety. No step reduces the new claim to the prior result by definition, renaming, or fitted input; the argument is a direct mathematical improvement. This matches the expected pattern of a self-contained derivation with non-load-bearing self-citation.
Axiom & Free-Parameter Ledger
axioms (2)
- standard math Standard axioms of algebraic geometry over an algebraically closed field, including properties of morphisms and group actions.
- domain assumption The earlier unirationality theorem providing a dominant map from the simple GL-variety.
Reference graph
Works this paper leans on
-
[1]
Small Subalgebras of Polynomial Rings and Stillman's Conjecture
Tigran Ananyan, Melvin Hochster. Small subalgebras of polynomial rings and Stillman's conjecture. J. Amer. Math. Soc. 33 (2020), no. 1, pp. 2910--309. doi:10.1090/jams/932 arXiv:1610.09268v1
work page internal anchor Pith review Pith/arXiv arXiv doi:10.1090/jams/932 2020
-
[2]
Strength and slice rank of forms are generically equal
Edoardo Ballico, Arthur Bik, Alessandro Oneto, Emanuele Ventura. Strength and slice rank of forms are generically equal. Israel J. Math. (2022). doi:10.1007/s11856-022-2397-0 arXiv:2102.11549
-
[3]
The set of forms with bounded strength is not closed
Edoardo Ballico, Arthur Bik, Alessandro Oneto, Emanuele Ventura. The set of forms with bounded strength is not closed. Compt. Rend. Math. 360 (2022), pp. 371--380. doi:10.5802/crmath.302 arXiv:2012.01237
-
[4]
Arthur Bik, Jan Draisma, Rob H. Eggermont, Andrew Snowden. The geometry of polynomial representations. Int.\ Math.\ Res.\ Not.\ IMRN 16 (2023), pp. 14131--14195. doi:10.1093/imrn/rnac220 arXiv:2105.12621
-
[5]
Arthur Bik, Jan Draisma, Rob H. Eggermont, Andrew Snowden. Uniformity for limits of tensors. arXiv:2305.19866
-
[6]
The geometry of polynomial representations in positive characteristic
Arthir Bik, Jan Draisma, Andrew Snowden. The geometry of polynomial representations in positive characteristic. Math. Z. 310(1) (2025), paper no. 13, 39 pp. doi:10.1007/s00209-025-03720-y arXiv:2406.07415
-
[7]
Topological noetherianity for cubic polynomials
Harm Derksen, Rob H. Eggermont, Andrew Snowden. Topological noetherianity for cubic polynomials. Algebra Number Theory 11 (2017), no. 9, pp. 2197--2212. doi:10.2140/ant.2017.11.2197 arXiv:1701.01849
work page internal anchor Pith review Pith/arXiv arXiv doi:10.2140/ant.2017.11.2197 2017
-
[8]
Topological Noetherianity of polynomial functors
Jan Draisma. Topological Noetherianity of polynomial functors. J.\ Amer.\ Math.\ Soc. 32 (2019), no. 3, pp. 691--707. doi:10.1090/jams/923 arXiv:1705.01419
work page internal anchor Pith review Pith/arXiv arXiv doi:10.1090/jams/923 2019
-
[9]
Applications of algebraic combinatorics to algebraic geometry
David Kazhdan, Tamar Ziegler. Applications of algebraic combinatorics to algebraic geometry. Indag.\ Math., New Ser. 32 (2021), no. 6, pp. 1412--1428. doi:10.1016/j.indag.2021.09.002 \ :2005.12542
-
[10]
Landsberg
Joseph M. Landsberg. Tensors: geometry and applications. Graduate Studies in Mathematics 128, American Mathematical Society, Providence, RI, 2012
2012
-
[11]
Noetherianity of some degree two twisted commutative algebras
Rohit Nagpal, Steven V Sam, Andrew Snowden. Noetherianity of some degree two twisted commutative algebras. Selecta Math.\ (N.S.) 22 (2016), no. 2, pp. 913--937. doi:10.1007/s00029-015-0205-y arXiv:1501.06925
work page internal anchor Pith review Pith/arXiv arXiv doi:10.1007/s00029-015-0205-y 2016
-
[12]
W. M. Schmidt. The density of integer points on homogeneous varieties. Acta Math. 154 (1985), no. 3--4, pp. 243--296. doi:10.1007/BF02392473
-
[13]
://stacks.math.columbia.edu (accessed May, 2026)
Stacks Project. ://stacks.math.columbia.edu (accessed May, 2026)
2026
-
[14]
Adrian R. Wadsworth. Hilbert subalgebras of finitely generated algebras. J.\ Algebra 43 (1976), pp. 298--304. doi:10.1016/0021-8693(76)90161-7
discussion (0)
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