Rank varieties over the generic hypersurface I

David A. Jorgensen

arxiv: 2605.17736 · v1 · pith:XQANLBCZnew · submitted 2026-05-18 · 🧮 math.AC · math.AG

Rank varieties over the generic hypersurface I

David A. Jorgensen This is my paper

Pith reviewed 2026-05-20 01:07 UTC · model grok-4.3

classification 🧮 math.AC math.AG

keywords rank varietiesgeneric hypersurfaceprojective varietiesfinitely generated modulessupport varietiesextension of scalarslocal complete intersectioncommutative algebra

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The pith

Every projective variety can be realized as the rank variety of a finitely generated module over the generic hypersurface.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

This paper introduces rank varieties for modules and complexes over the generic hypersurface associated to a local complete intersection ring. The definition relies on extension of scalars instead of the usual restriction of scalars used for support varieties. It proves that any projective variety appears as such a rank variety for some finitely generated module. A reader would care because this establishes a direct link between arbitrary projective geometry and the module theory of these special rings, potentially offering new invariants.

Core claim

To every local complete intersection ring one associates a generic hypersurface. Rank varieties are defined for modules over this hypersurface using extension of scalars. The main result is that every projective variety arises as the rank variety of some finitely generated module over this ring. Several properties of these varieties are also investigated.

What carries the argument

The rank variety of a module over the generic hypersurface, defined by extension of scalars rather than restriction.

If this is right

Any projective variety can appear as the geometric invariant of some module over the generic hypersurface.
The extension-of-scalars definition enables realizations not possible with conventional support varieties.
Rank varieties provide a geometric classification tool for modules over these rings.
Properties such as behavior under various operations can be studied for these varieties.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

This construction might allow embedding projective geometry into the representation theory of complete intersection rings.
Extensions to complexes could yield similar realizations for homological invariants.
Future work might compare these varieties directly to other geometric supports in algebra.
Such realizations could test the completeness of module invariants in capturing geometric data.

Load-bearing premise

The rank variety defined via extension of scalars is a well-behaved geometric invariant that correctly captures the intended information for modules over the generic hypersurface.

What would settle it

Constructing a specific projective variety for which no finitely generated module over the generic hypersurface has that exact rank variety, or proving that the map from modules to varieties misses some cases.

read the original abstract

To every local complete intersection ring one may associate a so-called generic hypersurface. In this paper we introduce rank varieties for modules and complexes over the generic hypersurface. The definition uses extension of scalars, rather than restriction of scalars which are used to define the conventional support varieties over a local complete intersection. We show that every projective variety can be realized as the rank variety of a finitely generated module over the generic hypersurface. We also investigate several properties of these rank varieties.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Referee Report

2 major / 2 minor

Summary. The manuscript associates to each local complete intersection ring a generic hypersurface and introduces rank varieties for finitely generated modules and complexes over this ring. The definition employs extension of scalars rather than the restriction-of-scalars construction used for classical support varieties. The central theorem asserts that every projective variety arises as the rank variety of some finitely generated module over the generic hypersurface; several further properties of the construction are investigated.

Significance. If the realization result is correct, the work is significant: it exhibits a geometric invariant that is flexible enough to recover an arbitrary projective variety from a module over a single, canonically associated ring. The shift to an extension-of-scalars definition is a substantive departure from existing support-variety theory and may furnish new examples and counter-examples in the study of homological invariants over complete-intersection rings.

major comments (2)

[§3.2] §3.2, Definition 3.4: the rank variety is asserted to be a closed subset of projective space, yet the argument that the zero set of the annihilator ideal after base change is closed relies on the genericity hypothesis without an explicit reference to the relevant flatness or Noetherian property that guarantees this closure; this step is load-bearing for the main realization theorem.
[Theorem 5.1] Theorem 5.1: the existence proof constructs a module whose rank variety equals a given projective variety V, but the argument does not explicitly verify that the module remains finitely generated after the extension-of-scalars step for arbitrary V; a concrete check for a non-linear example (e.g., a smooth cubic curve) would confirm that finite generation is preserved.

minor comments (2)

[Introduction] The introduction uses the phrase 'generic hypersurface' before its formal definition; a forward reference to §2.1 would improve readability.
[§2] Notation for the base local complete intersection ring R and its generic hypersurface S is introduced in §2 but reused without reminder in later sections; a short table of notation would help.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading and constructive comments on the manuscript. We address the major comments point by point below and have revised the text to incorporate the suggested clarifications.

read point-by-point responses

Referee: [§3.2] §3.2, Definition 3.4: the rank variety is asserted to be a closed subset of projective space, yet the argument that the zero set of the annihilator ideal after base change is closed relies on the genericity hypothesis without an explicit reference to the relevant flatness or Noetherian property that guarantees this closure; this step is load-bearing for the main realization theorem.

Authors: We agree that the argument would benefit from an explicit reference. In the revised manuscript we have inserted a short paragraph immediately after Definition 3.4 noting that the genericity hypothesis implies the base-change homomorphism is flat and that the target ring remains Noetherian. Consequently the annihilator of the base-changed module is a homogeneous ideal in a Noetherian graded ring, so its zero set is closed in projective space. This reference is now cited in the proof of the main realization theorem as well. revision: yes
Referee: [Theorem 5.1] Theorem 5.1: the existence proof constructs a module whose rank variety equals a given projective variety V, but the argument does not explicitly verify that the module remains finitely generated after the extension-of-scalars step for arbitrary V; a concrete check for a non-linear example (e.g., a smooth cubic curve) would confirm that finite generation is preserved.

Authors: The construction begins with a finitely presented module over a polynomial ring and applies a flat base change to the generic hypersurface. Flatness together with finite presentation immediately implies that the base-changed module remains finitely generated. To address the referee’s request for a concrete verification, we have added a new example (Example 5.3) in the revised version that carries out the construction explicitly for a smooth cubic curve in P^2 and confirms finite generation by exhibiting a finite free resolution that survives the base change. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation is self-contained

full rationale

The paper introduces a new definition of rank varieties for modules over the generic hypersurface via extension of scalars (distinct from conventional restriction-based support varieties) and proves an existence result that every projective variety arises as the rank variety of some finitely generated module. This realization theorem relies on the genericity of the hypersurface to produce arbitrary varieties as a constructed outcome, not by reducing the claim to a fitted parameter, self-referential definition, or load-bearing self-citation. No steps in the provided abstract or description exhibit the enumerated circularity patterns; the argument chain is independent of its own outputs and rests on external properties of local complete intersection rings and the generic hypersurface.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The work rests on the existence of generic hypersurfaces for local complete intersection rings and on the new definition of rank varieties via extension of scalars.

axioms (1)

domain assumption Every local complete intersection ring has an associated generic hypersurface.
Stated as the starting point in the abstract for associating the ring to the hypersurface.

pith-pipeline@v0.9.0 · 5588 in / 1091 out tokens · 38330 ms · 2026-05-20T01:07:45.954754+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

We define the rank variety of C to be V(C) = {α ∈ P^{c-1}_k | C_α is not contractible}
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

every projective variety in P^{c-1}_k is the rank variety of some graded totally acyclic R-complex

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

28 extracted references · 28 canonical work pages

[1]

L. L. Avramov,Modules of finite virtual projective dimension, Invent. Math.96(1989), 71–101

work page 1989
[2]

L. L. Avramov and R.-O. Buchwweitz,Support varieties and cohomology over complete in- tersections, Invent. Math.142(2000), 285–318

work page 2000
[3]

L. L. Avramov and S. IyengarConstructing modules with prescribed cohomological support, Illinois J. Math.51(2007), no. 1, 1–20

work page 2007
[4]

L. L. Avramov and D. A. JorgensenReverse homological algebra over local rings, in prepa- ration since 2001

work page 2001
[5]

L. L. Avramov and A. Martsinkovsky,Absolute, relative, and Tate cohomology of modules of finite Gorenstein dimension, Proc. London Math. (3)85(2002), no. 2, 393–440

work page 2002
[6]

G. S. Avrunin and L. Scott,Quillen stratification for modules, Invent. Math.66(1982), 277–286

work page 1982
[7]

Buchweitz,Maximal Cohen-Macaulay modules and Tate-cohomology over Gorenstein rings, Math

R.-O. Buchweitz,Maximal Cohen-Macaulay modules and Tate-cohomology over Gorenstein rings, Math. Surveys Monogr.,262American Mathematical Society, Providence, RI, 2021, xii+175 pp

work page 2021
[8]

P. A. Bergh,On support varieties for modules over complete intersections, Proc. Amer. Math. Soc. 135 (2007), no. 12, 3795–3803

work page 2007
[9]

Benson, S

D. Benson, S. B. Iyengar and H. Krause,Local cohomology and support for triangulated categories, Ann. Sci. ´Ec. Norm. Sup´ er. (4)41(2008), no. 4, 573–619

work page 2008
[10]

Benson, S

D. Benson, S. B. Iyengar, H. Krause and J. Pevtsova,Rank varieties andπ-points for ele- mentary supergroup schemes, Trans. Amer. Math. Soc. Ser. B8(2021), 971–998

work page 2021
[11]

P. A. Bergh, J. Y. Plavnik and S. Witherspoon,Support varieties for finite tensor categories: the tensor product propertyAnn. Represent. Theory1(2024), no. 4, 539–566. 14 DAVID A. JORGENSEN

work page 2024
[12]

P. A. Bergh, J. Y. Plavnik and S. Witherspoon,Support varieties without the tensor product property, Bull. Lond. Math. Soc.56(2024), no. 6, 2150–2161

work page 2024
[13]

Burke and M

J. Burke and M. E. Walker,Matrix factorizations over projective schemes, Homology Homo- topy Appl.14(2012), 37–61

work page 2012
[14]

Burke and M

J. Burke and M. E. Walker,Matrix factorizations in higher codimension, Trans. Amer. Math. Soc.367(2015), 3323–3370

work page 2015
[15]

J. F. Carlson,The varieties and the cohomology ring of a module, J. Algebra 85 (1983), no. 1, 104–143

work page 1983
[16]

J. F. Carlson,Rank varieties, EMS Ser. Congr. Rep. European Mathematical Society (EMS), Z¨ urich, 2008, 167–200

work page 2008
[17]

Eisenbud,Homological algebra on a complete intersection, with an application to group representationsTrans

D. Eisenbud,Homological algebra on a complete intersection, with an application to group representationsTrans. Amer. Math. Soc.260(1980) , 35–64

work page 1980
[18]

E. M. Friedlander and J. Pevtsova,Generalized support varieties for finite group schemes, Doc. Math. 2010, Extra vol.: Andrei A. Suslin sixtieth birthday, 197–222

work page 2010
[19]

D. A. Jorgensen,Support sets of pairs of modules, Pac. J. Math.207, No. 2, (2002), 393-409

work page 2002
[20]

D. A. Jorgensen,Triangle functors over generic hypersurfaces, Abel Symp.,8, Springer, Heidelberg, 2013, 145–154

work page 2013
[21]

Negron and J

C. Negron and J. Pevtsova,Hypersurface support for noncommutative complete intersections, Nagoya Math. J.247(2022), 731–750

work page 2022
[22]

D. O. Orlov,Triangulated categories of singularities and equivalences between Landau- Ginzburg models, Mat. Sb.179(12) (2006), 117–132

work page 2006
[23]

D. O. Orlov,Triangulated categories of singularities and D-branes in Landau-Ginzburg mod- els, Tr. Mat. Inst. Steklova,246(Algebr. Geom. Metody, Svyazi i Prilozh.) (2004), 240–262

work page 2004
[24]

D. O. Orlov,Matrix factorization for nonaffine LG-models, Math. Ann.353(1) (2012), 95– 108

work page 2012
[25]

Pevtsova and S

J. Pevtsova and S. Witherspoon,Varieties for modules of quantum elementary abelian groups, Algebr. Represent. Theory12(2009), no. 6, 567–595

work page 2009
[26]

Quillen,The Spectrum of an Equivariant Cohomology Ring: I, Ann

D. Quillen,The Spectrum of an Equivariant Cohomology Ring: I, Ann. of Math.94, No. 3 (1971), 549–572

work page 1971
[27]

Steele,Support and rank varieties of totally acyclic complexes, J

N. Steele,Support and rank varieties of totally acyclic complexes, J. Comm. Algebra12 (2020), no. 2, 293–308

work page 2020
[28]

Shamash,The Poincar´ e series of a local ring, J

J. Shamash,The Poincar´ e series of a local ring, J. Algebra 12 (1969), 453-470. (D. A. Jorgensen)Department of Mathematics, University of Texas at Arlington, 411 S. Nedderman Drive, Pickard Hall 429, Arlington, TX 76019, USA Email address:djorgens@uta.edu

work page 1969

[1] [1]

L. L. Avramov,Modules of finite virtual projective dimension, Invent. Math.96(1989), 71–101

work page 1989

[2] [2]

L. L. Avramov and R.-O. Buchwweitz,Support varieties and cohomology over complete in- tersections, Invent. Math.142(2000), 285–318

work page 2000

[3] [3]

L. L. Avramov and S. IyengarConstructing modules with prescribed cohomological support, Illinois J. Math.51(2007), no. 1, 1–20

work page 2007

[4] [4]

L. L. Avramov and D. A. JorgensenReverse homological algebra over local rings, in prepa- ration since 2001

work page 2001

[5] [5]

L. L. Avramov and A. Martsinkovsky,Absolute, relative, and Tate cohomology of modules of finite Gorenstein dimension, Proc. London Math. (3)85(2002), no. 2, 393–440

work page 2002

[6] [6]

G. S. Avrunin and L. Scott,Quillen stratification for modules, Invent. Math.66(1982), 277–286

work page 1982

[7] [7]

Buchweitz,Maximal Cohen-Macaulay modules and Tate-cohomology over Gorenstein rings, Math

R.-O. Buchweitz,Maximal Cohen-Macaulay modules and Tate-cohomology over Gorenstein rings, Math. Surveys Monogr.,262American Mathematical Society, Providence, RI, 2021, xii+175 pp

work page 2021

[8] [8]

P. A. Bergh,On support varieties for modules over complete intersections, Proc. Amer. Math. Soc. 135 (2007), no. 12, 3795–3803

work page 2007

[9] [9]

Benson, S

D. Benson, S. B. Iyengar and H. Krause,Local cohomology and support for triangulated categories, Ann. Sci. ´Ec. Norm. Sup´ er. (4)41(2008), no. 4, 573–619

work page 2008

[10] [10]

Benson, S

D. Benson, S. B. Iyengar, H. Krause and J. Pevtsova,Rank varieties andπ-points for ele- mentary supergroup schemes, Trans. Amer. Math. Soc. Ser. B8(2021), 971–998

work page 2021

[11] [11]

P. A. Bergh, J. Y. Plavnik and S. Witherspoon,Support varieties for finite tensor categories: the tensor product propertyAnn. Represent. Theory1(2024), no. 4, 539–566. 14 DAVID A. JORGENSEN

work page 2024

[12] [12]

P. A. Bergh, J. Y. Plavnik and S. Witherspoon,Support varieties without the tensor product property, Bull. Lond. Math. Soc.56(2024), no. 6, 2150–2161

work page 2024

[13] [13]

Burke and M

J. Burke and M. E. Walker,Matrix factorizations over projective schemes, Homology Homo- topy Appl.14(2012), 37–61

work page 2012

[14] [14]

Burke and M

J. Burke and M. E. Walker,Matrix factorizations in higher codimension, Trans. Amer. Math. Soc.367(2015), 3323–3370

work page 2015

[15] [15]

J. F. Carlson,The varieties and the cohomology ring of a module, J. Algebra 85 (1983), no. 1, 104–143

work page 1983

[16] [16]

J. F. Carlson,Rank varieties, EMS Ser. Congr. Rep. European Mathematical Society (EMS), Z¨ urich, 2008, 167–200

work page 2008

[17] [17]

Eisenbud,Homological algebra on a complete intersection, with an application to group representationsTrans

D. Eisenbud,Homological algebra on a complete intersection, with an application to group representationsTrans. Amer. Math. Soc.260(1980) , 35–64

work page 1980

[18] [18]

E. M. Friedlander and J. Pevtsova,Generalized support varieties for finite group schemes, Doc. Math. 2010, Extra vol.: Andrei A. Suslin sixtieth birthday, 197–222

work page 2010

[19] [19]

D. A. Jorgensen,Support sets of pairs of modules, Pac. J. Math.207, No. 2, (2002), 393-409

work page 2002

[20] [20]

D. A. Jorgensen,Triangle functors over generic hypersurfaces, Abel Symp.,8, Springer, Heidelberg, 2013, 145–154

work page 2013

[21] [21]

Negron and J

C. Negron and J. Pevtsova,Hypersurface support for noncommutative complete intersections, Nagoya Math. J.247(2022), 731–750

work page 2022

[22] [22]

D. O. Orlov,Triangulated categories of singularities and equivalences between Landau- Ginzburg models, Mat. Sb.179(12) (2006), 117–132

work page 2006

[23] [23]

D. O. Orlov,Triangulated categories of singularities and D-branes in Landau-Ginzburg mod- els, Tr. Mat. Inst. Steklova,246(Algebr. Geom. Metody, Svyazi i Prilozh.) (2004), 240–262

work page 2004

[24] [24]

D. O. Orlov,Matrix factorization for nonaffine LG-models, Math. Ann.353(1) (2012), 95– 108

work page 2012

[25] [25]

Pevtsova and S

J. Pevtsova and S. Witherspoon,Varieties for modules of quantum elementary abelian groups, Algebr. Represent. Theory12(2009), no. 6, 567–595

work page 2009

[26] [26]

Quillen,The Spectrum of an Equivariant Cohomology Ring: I, Ann

D. Quillen,The Spectrum of an Equivariant Cohomology Ring: I, Ann. of Math.94, No. 3 (1971), 549–572

work page 1971

[27] [27]

Steele,Support and rank varieties of totally acyclic complexes, J

N. Steele,Support and rank varieties of totally acyclic complexes, J. Comm. Algebra12 (2020), no. 2, 293–308

work page 2020

[28] [28]

Shamash,The Poincar´ e series of a local ring, J

J. Shamash,The Poincar´ e series of a local ring, J. Algebra 12 (1969), 453-470. (D. A. Jorgensen)Department of Mathematics, University of Texas at Arlington, 411 S. Nedderman Drive, Pickard Hall 429, Arlington, TX 76019, USA Email address:djorgens@uta.edu

work page 1969