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arxiv: 1907.09694 · v1 · pith:KWP2DQZ3new · submitted 2019-07-23 · 🧮 math.AG · math.DG

Rigidity of smooth Schubert varieties in a rational homogeneous manifold associated to a short root

Pith reviewed 2026-05-24 17:35 UTC · model grok-4.3

classification 🧮 math.AG math.DG
keywords Schubert varietiesrigidityrational homogeneous manifoldsshort rootshomology classesautomorphism groupsalgebraic geometry
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The pith

Smooth Schubert varieties in short-root rational homogeneous spaces are rigid unless linear.

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

The paper classifies all smooth Schubert varieties inside rational homogeneous manifolds built from short roots. It then proves a rigidity statement: any subvariety sharing the same homology class must arise as an orbit under the connected component of the automorphism group of the ambient space. This fails only when the Schubert variety is linear. A reader cares because the result pins down exactly which cycles can appear in these homogeneous spaces and rules out other realizations with the same topological invariants.

Core claim

We classify smooth Schubert varieties S_0 in a rational homogeneous manifold S associated to a short root, and show that they are rigid in the sense that any subvariety of S having the same homology class as S_0 is induced by the action of Aut_0(S), unless S_0 is linear.

What carries the argument

Rigidity of a smooth Schubert variety with respect to its homology class under the action of the connected automorphism group Aut_0(S).

If this is right

  • Non-linear smooth Schubert varieties have no other realizations in their homology class outside Aut_0(S)-orbits.
  • The classification exhausts all smooth Schubert varieties in the allowed ambient spaces.
  • Linear Schubert varieties are the only ones that may admit additional subvarieties in the same class.

Where Pith is reading between the lines

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

  • The result suggests that short-root homogeneous spaces have unusually constrained cycle geometry compared with longer-root cases.
  • One could test whether similar rigidity holds after allowing mild singularities or after base change to other fields.
  • The classification may interact with questions about which homology classes are represented by smooth subvarieties at all.

Load-bearing premise

The ambient space must be a rational homogeneous manifold associated to a short root.

What would settle it

A concrete subvariety with the same homology class as a non-linear smooth Schubert variety S_0 that is not an Aut_0(S)-orbit would falsify the rigidity statement.

read the original abstract

We classify smooth Schubert varieties S_0 in a rational homogeneous manifold S associated to a short root, and show that they are rigid in the sense that any subvariety of S having the same homology class as S_0 is induced by the action of Aut_0(S), unless S_0 is linear.

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

1 major / 0 minor

Summary. The paper classifies smooth Schubert varieties S_0 in a rational homogeneous manifold S associated to a short root, and proves they are rigid: any subvariety of S with the same homology class as S_0 is induced by the action of Aut_0(S), unless S_0 is linear.

Significance. If the classification is exhaustive and the rigidity statement holds, the result would add to the literature on rigidity and deformation of Schubert varieties in homogeneous spaces, with potential implications for understanding automorphism groups and homology classes in algebraic geometry of flag varieties and rational homogeneous manifolds.

major comments (1)
  1. The provided text consists solely of the abstract statement of the classification and rigidity theorem. No sections, equations, or proof sketches are visible, so the completeness of the list of smooth Schubert varieties and the deformation/rigidity argument cannot be assessed for gaps or correctness.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for reviewing our manuscript. We address the sole major comment below.

read point-by-point responses
  1. Referee: The provided text consists solely of the abstract statement of the classification and rigidity theorem. No sections, equations, or proof sketches are visible, so the completeness of the list of smooth Schubert varieties and the deformation/rigidity argument cannot be assessed for gaps or correctness.

    Authors: The full manuscript, including the complete classification of smooth Schubert varieties associated to short roots, all equations, detailed proofs of rigidity (via homology preservation and automorphism action), and case-by-case analysis, is available on arXiv:1907.09694. The abstract was supplied as a concise summary for the review process, but the referee can access the entire document there to evaluate the arguments for gaps or correctness. No changes to the manuscript are required on this basis. revision: no

Circularity Check

0 steps flagged

No significant circularity identified

full rationale

The paper states a classification of smooth Schubert varieties together with a rigidity theorem in the setting of rational homogeneous manifolds for short roots. No equations, fitted parameters, or empirical reductions appear in the provided abstract or description. The result is presented as a theorem proved via standard methods in algebraic geometry and Lie theory (root systems, parabolic subgroups, homology classes, and automorphism actions), without any of the enumerated circular patterns such as self-definitional loops, fitted inputs renamed as predictions, or load-bearing self-citations that reduce the central claim to its own inputs. The derivation is therefore self-contained against external benchmarks in the field.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities; the setting itself (rational homogeneous manifold associated to short root) functions as an unexpanded domain assumption.

pith-pipeline@v0.9.0 · 5567 in / 1071 out tokens · 29725 ms · 2026-05-24T17:35:22.658978+00:00 · methodology

discussion (0)

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Reference graph

Works this paper leans on

15 extracted references · 15 canonical work pages

  1. [1]

    Billey and A

    S. Billey and A. Postnikov, Smoothness of Schubert varieties via patterns in root subsy stems, Adv. in Appl. Math. 34 (2005), no. 3, 447–466

  2. [2]

    Hong and N

    J. Hong and N. Mok Characterization of smooth Schubert varieties in rational homogeneous man- ifolds of Picard number 1 , J. Algebraic Geom. 22 333–362 (2013)

  3. [3]

    Hong and K.-D

    J. Hong and K.-D. Park, Characterization of Standard Embeddings between Rational Homogeneous Manifolds of Picard Number 1 , Int. Math. Res. Notices, 2011 2351–2373 (2011)

  4. [4]

    Hong, Smooth horospherical varieties of Picard number one as line ar sections of rational homo- geneous varieties , J

    J. Hong, Smooth horospherical varieties of Picard number one as line ar sections of rational homo- geneous varieties , J. Korean Math. Soc. 53 no. 2, 433–459 (2016)

  5. [5]

    Hong, Classification of smooth Schubert varieties in the symplect ic Grassmannian , J

    J. Hong, Classification of smooth Schubert varieties in the symplect ic Grassmannian , J. Korean Math. Soc. 52 no. 5, 1109–1122 (2015)

  6. [6]

    Hwang and N

    J.-M. Hwang and N. Mok, Varieties of minimal rational tangents on uniruled project ive mani- folds, in:M. Schneider, Y.-T. Siu (Eds.), Several complex variab les, MSRI publications, Vol 37, Cambridge University Press, 1999, pp. 351 – 389

  7. [7]

    Hwang and N

    J.-M. Hwang and N. Mok, Deformation rigidity of the rational homogeneous space ass ociated to a long simple root , Ann. Scient. ´Ec. Norm. Sup., 4 e s´ erie, t. 35. 2002, p. 173 ´ a 184

  8. [8]

    Mok, Deformation rigidity of the 20-dimensional F4-homogeneous space associated to a short root

    J.-M., Hwang and N. Mok, Deformation rigidity of the 20-dimensional F4-homogeneous space associated to a short root . Algebraic transformation groups and algebraic varieties , 37–58, Ency- clopaedia Math. Sci., 132, Springer, Berlin, 2004

  9. [9]

    Hwang and N

    J.-M. Hwang and N. Mok, Prolongations of infinitsimal linear automorphisms of proj ective varieties and rigidity of rational homogeneous spaces of Picard numbe r 1 under K¨ ahler deformation, Invent. Math. 160 (2005), no. 3, 591–645

  10. [10]

    Manivel, On the projective geometry of rational homogeneous varieti es, Comment

    J.M Landsberg and L. Manivel, On the projective geometry of rational homogeneous varieti es, Comment. Math. Helv. 78 (2003), no. 1, 65–100

  11. [11]

    I. A. Mihai, Odd symplectic flag manifolds , Transform. Groups 12 (2007), no. 3, 573–599

  12. [12]

    Mok, Geometric structures and substructures on uniruled projec tive manifolds , Foliation Theory in Algebraic Geometry (Simons Symposia), P

    N. Mok, Geometric structures and substructures on uniruled projec tive manifolds , Foliation Theory in Algebraic Geometry (Simons Symposia), P. Cascini, J. McK ernan and J.V.Pereira, Springer- Verlarg, 103–148, 2016. 16 J. HONG AND M. KWON

  13. [13]

    Pasquier, On some smooth projective two-orbit varieties with Picard n umber one , Math

    B. Pasquier, On some smooth projective two-orbit varieties with Picard n umber one , Math. Ann. 344, no. 4, 963–987 (2009)

  14. [14]

    Polo, On Zariski tangent spaces of Schubert varietie s, and a proof of a conjecture of Deodhar

    P. Polo, On Zariski tangent spaces of Schubert varietie s, and a proof of a conjecture of Deodhar. Indag.Mathem., Volume 5, Issue 4, 483–493, (1994)

  15. [15]

    Richmond and W

    E. Richmond and W. Slofstra, Billey-Postnikov decompositions and the fiber bundle struc ture of Schubert varieties , Math. Ann. (2016) 366:31-55 Korea Institute for Advanced Study, 85 Hoegiro, Dongdaemun -gu, Seoul 02455, Korea E-mail address : jhhong00@kias.re.kr Department of Mathematical Sciences, Seoul National University, 599 Gw anak-ro Gw anak- gu Se...