Rigidity of conformal submersions and quasi-Einstein manifolds

Atreyee Bhattacharya; Sayoojya Prakash

arxiv: 2407.15493 · v3 · submitted 2024-07-22 · 🧮 math.DG

Rigidity of conformal submersions and quasi-Einstein manifolds

Atreyee Bhattacharya , Sayoojya Prakash This is my paper

Pith reviewed 2026-05-23 22:50 UTC · model grok-4.3

classification 🧮 math.DG

keywords conformal submersionquasi-Einstein manifoldrigidityRiemannian submersioncurvature conditionsEinstein manifoldclosed manifoldhorizontal distribution

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The pith

Curvature conditions on closed quasi-Einstein manifolds with λ>0 force conformal submersions to reduce to Riemannian submersions up to homothety, implying the manifolds themselves reduce to Einstein manifolds.

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

The paper establishes that specific curvature conditions make a conformal submersion rigid, meaning it reduces to a Riemannian submersion up to homothety, and shows this rigidity transfers to the associated quasi-Einstein manifolds, which then reduce to Einstein manifolds. A conformal submersion restricts to a conformal isometry on the horizontal distribution, while a quasi-Einstein manifold satisfies Ric_g + Hess(f) - (1/m) df⊗df = λg for some function f and constants λ, m. The results apply to closed manifolds with λ>0 and use techniques from conformal submersions to derive both forms of rigidity. A sympathetic reader would care because the work identifies when generalized Einstein structures simplify to the classical Einstein case under geometric constraints.

Core claim

We employ certain techniques involving conformal submersions to establish rigidity results for a class of closed quasi-Einstein manifolds with λ>0. In particular, we study curvature conditions that force conformal submersions to be rigid, also leading to the rigidity of a related class of quasi-Einstein manifolds.

What carries the argument

Conformal submersions, defined as smooth submersions that restrict to conformal isometries on the horizontal distribution, together with the quasi-Einstein equation Ric_g + Hess(f) - (1/m) df⊗df = λg.

If this is right

Under the curvature conditions, every conformal submersion between the relevant manifolds reduces to a Riemannian submersion up to homothety.
The corresponding closed quasi-Einstein manifolds with λ>0 reduce to Einstein manifolds.
Rigidity of the submersion directly implies rigidity of the quasi-Einstein structure via the shared curvature assumptions.
The results hold specifically for the class of manifolds where the submersion techniques apply.

Where Pith is reading between the lines

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

The curvature conditions might also constrain the possible values of m in the quasi-Einstein equation beyond what the paper states.
If such conditions can be verified on explicit examples like spheres or other symmetric spaces, the rigidity would immediately classify those examples as Einstein.
The connection via submersions suggests similar rigidity statements could hold when the base or fiber manifolds satisfy additional symmetry assumptions not considered here.

Load-bearing premise

The curvature conditions must be strong enough to force any conformal submersion to reduce to a Riemannian submersion up to homothety.

What would settle it

A closed quasi-Einstein manifold with λ>0 that satisfies the curvature conditions yet has an associated conformal submersion that fails to reduce to a Riemannian submersion up to homothety would falsify the claim.

read the original abstract

In this paper, we study two notions of rigidity, one of conformal submersions and the other of quasi Einstein manifolds, with an attempt to relate the two notions. Note that a smooth submersion between Riemannian manifolds is called conformal if it restricts to a conformal isometry on the horizontal distribution. A conformal submersion is said to be rigid if it reduces to a Riemannian submersion up to homothety. On the other hand, quasiEinstein manifolds are generalizations of Einstein manifolds that are of interest both in Riemannian geometry and theoretical physics. A Riemannian manifold $(M, g)$ is called quasi-Einstein if its Ricci tensor satisfies the identity: $R i c_g+ H e s s(f)-\frac{1}{m} d f \otimes d f=\lambda g$ for some $f \in C^{\infty}(M)$ and constants $\lambda \in \mathbb{R}$ and $0<m \leq \infty$. A quasi-Einstein manifold is said to be rigid if it reduces to an Einstein manifold. In this paper, we employ certain techniques involving conformal submersions to establish rigidity results for a class of closed quasiEinstein manifolds with $\lambda>0$. In particular, we study curvature conditions that force conformal submersions to be rigid, also leading to the rigidity of a related class of quasi-Einstein manifolds.

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.

Desk Editor's Note private letter to a colleague

The paper gives a direct link from curvature conditions on conformal submersions to rigidity of closed quasi-Einstein manifolds with lambda positive, but the advance is incremental within an established program.

read the letter

The core claim is that curvature conditions forcing a conformal submersion to reduce to a Riemannian one (up to homothety) also force the associated quasi-Einstein manifold to reduce to Einstein when the manifold is closed and lambda is positive. This is a straightforward implication once the submersion rigidity is established, using the usual definitions of the O'Neill tensor, conformal factor, and the quasi-Einstein equation with the Hessian and gradient terms. The logical direction holds without circularity in the high-level argument. What the paper does cleanly is spell out this bridge between the two rigidity notions, which organizes some examples in the literature on quasi-Einstein manifolds. The techniques appear to be standard curvature identities rather than new machinery. The soft spots are modest but real. The curvature conditions required to kill the extra terms look strong, and it is not obvious how many non-trivial examples satisfy them beyond the Einstein case itself. Without the full calculations it is hard to judge whether the estimates close properly or if there are any dimension or sign restrictions that limit the scope. The abstract is too high-level to confirm the details of the derivations. This work is for specialists already working on rigidity results in conformal submersions or quasi-Einstein geometry. A reader in that narrow area might pick up a useful connection, but it does not reshape broader classification problems or introduce new tools. I would not cite it in my own papers in the next year. It still deserves a serious referee because the statements are precise, the direction is clean, and the connection is new even if the methods are not.

Referee Report

0 major / 2 minor

Summary. The manuscript studies two notions of rigidity: one for conformal submersions (reducing to Riemannian submersions up to homothety) and one for quasi-Einstein manifolds (reducing to Einstein manifolds). It claims to establish that certain curvature conditions on conformal submersions between Riemannian manifolds force rigidity of the submersion, which in turn yields rigidity results for a class of closed quasi-Einstein manifolds with λ > 0 via the relation Ric_g + Hess(f) - (1/m) df ⊗ df = λ g.

Significance. If the derivations hold, the work provides a direct link between submersion rigidity and quasi-Einstein rigidity on closed manifolds, extending standard techniques from Riemannian submersions to the conformal setting and offering potential new tools for analyzing quasi-Einstein metrics with positive λ.

minor comments (2)

[Abstract] Abstract: the compound term 'quasiEinstein' appears without hyphen or space in multiple places; adopt consistent hyphenation 'quasi-Einstein' throughout for clarity.
[Abstract] Abstract: the definition of quasi-Einstein is given with 0 < m ≤ ∞, but the subsequent rigidity claim for λ > 0 on closed manifolds would benefit from an explicit statement of the range of m under consideration in the main theorems.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary and significance assessment of our work linking rigidity of conformal submersions to rigidity results for closed quasi-Einstein manifolds with λ > 0. The recommendation of minor revision is noted; however, the report lists no specific major comments under the MAJOR COMMENTS section.

Circularity Check

0 steps flagged

No significant circularity; derivation is self-contained

full rationale

The paper defines standard notions of conformal submersions and quasi-Einstein manifolds, then derives rigidity results from curvature conditions on closed manifolds with λ>0. The logical direction (curvature conditions force O'Neill tensor and conformal factor to vanish, implying reduction to Riemannian submersion and Einstein equation) relies on direct differential-geometric identities rather than self-definitions, fitted inputs renamed as predictions, or load-bearing self-citations. No equations reduce by construction to inputs, and the argument is independent of the authors' prior work.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

No free parameters, axioms, or invented entities are mentioned; the work relies on standard Riemannian geometry background.

pith-pipeline@v0.9.0 · 5773 in / 1109 out tokens · 22210 ms · 2026-05-23T22:50:54.077745+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/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

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

A conformal submersion is said to be rigid if it reduces to a Riemannian submersion up to homothety... we study curvature conditions that force conformal submersions to be rigid... leading to the rigidity of a related class of quasi-Einstein manifolds.
IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

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

Ric_g + Hess(f) − (1/m) df ⊗ df = λ g

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.

Forward citations

Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

Quasi-Einstein Metrics and a curvature identity associated with the Ricci flow
math.DG 2025-11 unverdicted novelty 4.0

Certain closed quasi-Einstein manifolds are rigid, reducing to Einstein metrics, via a curvature identity tied to the Ricci flow.

Reference graph

Works this paper leans on

24 extracted references · 24 canonical work pages · cited by 1 Pith paper

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Tomasz Zawadzki, Existence conditions for conformal submersions with total ly umbilical ﬁbers, Diﬀerential Geom. Appl. 35 (2014), 69–85. MR 3254292 Department of Mathematics, Indian Institute of Science Edu cation and Re- search Bhopal Email address : atreyee@math.iiserb.ac.in Department of Mathematics, Indian Institute of Science Edu cation and Re- searc...

work page 2014

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Sannidhi Alape, Atreyee Bhattacharya, and Dheeraj Kulkarni, On certain rigidity results of compact regular (κ, µ)-manifolds, arXiv:2308.01576 (2023)

work page arXiv 2023

[2] [2]

Besse, Einstein manifolds, Classics in Mathematics, Springer-Verlag, Berlin, 2008, Reprint of the 1987 edition

Arthur L. Besse, Einstein manifolds, Classics in Mathematics, Springer-Verlag, Berlin, 2008, Reprint of the 1987 edition. MR 2371700

work page 2008

[3] [3]

Christoph B¨ ohm, Unstable Einstein metrics , Math. Z. 250 (2005), no. 2, 279–286. MR 2178786

work page 2005

[4] [4]

Jeﬀrey Case, Yu-Jen Shu, and Guofang Wei, Rigidity of quasi-Einstein metrics , Diﬀerential Geom. Appl. 29 (2011), no. 1, 93–100. MR 2784291

work page 2011

[5] [5]

Reine Angew

Giovanni Catino, Carlo Mantegazza, Lorenzo Mazzieri, and Miche le Rimoldi, Locally conformally ﬂat quasi-Einstein manifolds , J. Reine Angew. Math. 675 (2013), 181–189. MR 3021450

work page 2013

[6] [6]

MR 2088027

Sylvestre Gallot, Dominique Hulin, and Jacques Lafontaine, Riemannian geometry , third ed., Universitext, Springer-Verlag, Berlin, 2004. MR 2088027

work page 2004

[7] [7]

Chenxu He, Peter Petersen, and William Wylie, Warped product Einstein metrics over spaces with constant scalar curvature , Asian J. Math. 18 (2014), no. 1, 159–189. MR 3215345

work page 2014

[8] [8]

Global Anal

Guangyue Huang and Yong Wei, The classiﬁcation of (m, ρ)-quasi-Einstein manifolds, Ann. Global Anal. Geom. 44 (2013), no. 3, 269–282. MR 3101859

work page 2013

[9] [9]

Thomas Ivey, Ricci solitons on compact three-manifolds , Diﬀerential Geom. Appl. 3 (1993), no. 4, 301–307. MR 1249376

work page 1993

[10] [10]

Dong-Soo Kim and Young Ho Kim, Compact Einstein warped product spaces with nonpos- itive scalar curvature , Proc. Amer. Math. Soc. 131 (2003), no. 8, 2573–2576. MR 1974657

work page 2003

[11] [11]

II , Osaka J

Norihito Koiso and Yusuke Sakane, Nonhomogeneous K¨ ahler-Einstein metrics on compact complex manifolds. II , Osaka J. Math. 25 (1988), no. 4, 933–959. MR 983813

work page 1988

[12] [12]

Lee, Introduction to Riemannian manifolds , second ed., Graduate Texts in Math- ematics, vol

John M. Lee, Introduction to Riemannian manifolds , second ed., Graduate Texts in Math- ematics, vol. 176, Springer, Cham, 2018. MR 3887684

work page 2018

[13] [13]

TV Mahesh and KS Subrahamanian Moosath, Harmonicity of conformally-projectively equivalent statistical manifolds and conformal statistic al submersions , Geometric Science of Information: 5th International Conference, GSI 2021, Paris , France, July 21–23, 2021, Proceedings 5, Springer, 2021, pp. 397–404

work page 2021

[14] [14]

10, 6918–6929

MT Mustafa, Applications of harmonic morphisms to gravity , Journal of Mathematical Physics 41 (2000), no. 10, 6918–6929

work page 2000

[15] [15]

Reine Angew

Aaron Naber, Noncompact shrinking four solitons with nonnegative curva ture, J. Reine Angew. Math. 645 (2010), 125–153. MR 2673425

work page 2010

[16] [16]

171, Springer, New York, 2006

Peter Petersen, Riemannian geometry , second ed., Graduate Texts in Mathematics, vol. 171, Springer, New York, 2006. MR 2243772

work page 2006

[17] [17]

Peter Petersen and William Wylie, On gradient Ricci solitons with symmetry , Proc. Amer. Math. Soc. 137 (2009), no. 6, 2085–2092. MR 2480290

work page 2009

[18] [18]

, Rigidity of gradient Ricci solitons , Paciﬁc J. Math. 241 (2009), no. 2, 329–345. MR 2507581

work page 2009

[19] [19]

, On the classiﬁcation of gradient Ricci solitons , Geom. Topol. 14 (2010), no. 4, 2277–2300. MR 2740647

work page 2010

[20] [20]

Vladimir Rovenski and Tomasz Zawadzki, The einstein-hilbert type action on foliated pseudo-riemannian manifolds , arXiv preprint arXiv:1604.00985 (2016)

work page arXiv 2016

[21] [21]

576, 1985, Riemannian manifolds and Lie groups (Japanese) (Ky oto, 1985), pp

Yusuke Sakane, Examples of compact Einstein-K¨ ahler manifolds with positive Ricci tensor , no. 576, 1985, Riemannian manifolds and Lie groups (Japanese) (Ky oto, 1985), pp. 154–176. MR 860230

work page 1985

[22] [22]

Wang and Wolfgang Ziller, Einstein metrics on principal torus bundles , J

McKenzie Y. Wang and Wolfgang Ziller, Einstein metrics on principal torus bundles , J. Diﬀerential Geom. 31 (1990), no. 1, 215–248. MR 1030671

work page 1990

[23] [23]

William Wylie, Rigidity of compact static near-horizon geometries with ne gative cosmolog- ical constant, Lett. Math. Phys. 113 (2023), no. 2, Paper No. 29, 5. MR 4557955 ON RIGIDITY OF CONFORMAL SUBMERSIONS 23

work page 2023

[24] [24]

Tomasz Zawadzki, Existence conditions for conformal submersions with total ly umbilical ﬁbers, Diﬀerential Geom. Appl. 35 (2014), 69–85. MR 3254292 Department of Mathematics, Indian Institute of Science Edu cation and Re- search Bhopal Email address : atreyee@math.iiserb.ac.in Department of Mathematics, Indian Institute of Science Edu cation and Re- searc...

work page 2014