On contact and finitely Levi-nondegenerate CR algebras

Costantino Medori; Mauro Nacinovich; Stefano Marini

arxiv: 2512.11604 · v2 · submitted 2025-12-12 · 🧮 math.DG

On contact and finitely Levi-nondegenerate CR algebras

Stefano Marini , Costantino Medori , Mauro Nacinovich This is my paper

Pith reviewed 2026-05-16 22:24 UTC · model grok-4.3

classification 🧮 math.DG

keywords CR-manifoldsLevi-nondegeneracycontact-nondegeneracyCR-algebrasroot diagramsparabolic geometrylocally homogeneous structures

0 comments

The pith

CR-manifolds of arbitrary codimension have their Levi-nondegeneracy, contact-nondegeneracy and depth corresponding to properties of associated CR-algebras and combinatorics of cross-marked painted root diagrams.

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

The paper develops a theory that links the geometric invariants of CR-manifolds, including Levi-nondegeneracy, contact-nondegeneracy and depth, to the algebraic structure of associated CR-algebras in the locally homogeneous case. For parabolic CR-algebras this correspondence extends to the combinatorics of cross-marked painted root diagrams. A sympathetic reader would care because the approach supplies an algebraic and combinatorial language for invariants that are otherwise difficult to track directly on the manifold itself in higher codimensions.

Core claim

The central claim is that correspondences exist between the Levi and contact nondegeneracy and depth of CR-manifolds of arbitrary codimension and the related properties of their associated CR-algebras, with these correspondences established through a comprehensive theory in the locally homogeneous setting; in the parabolic case the correspondences further relate to the combinatorics of the cross-marked painted root diagrams of the algebras.

What carries the argument

The associated CR-algebra of a locally homogeneous CR-manifold, together with its cross-marked painted root diagram when parabolic, which encodes the algebraic and combinatorial data corresponding to the geometric nondegeneracy invariants.

If this is right

The depth of a CR-manifold is read directly from the grading or nilpotency structure of its CR-algebra.
Levi-nondegeneracy and contact-nondegeneracy conditions on the manifold translate into explicit nondegeneracy conditions on the CR-algebra.
Classification of such CR-manifolds reduces to classification of admissible CR-algebras and, in the parabolic case, to combinatorial enumeration of their cross-marked painted root diagrams.
Local homogeneous models determine the essential invariants that must hold on any CR-manifold sharing the same algebra.

Where Pith is reading between the lines

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

The same algebraic dictionary could be used to generate new families of CR-manifolds by starting from chosen CR-algebras rather than from geometric constructions.
The framework suggests a way to compare CR-structures across different codimensions by comparing their associated algebras and diagrams.
Parabolic examples may serve as local models for studying global questions in parabolic geometries that involve similar root-system combinatorics.

Load-bearing premise

That the locally homogeneous case and the associated CR-algebra structure fully capture the essential invariants of Levi-nondegeneracy, contact-nondegeneracy and depth for general CR-manifolds of arbitrary codimension.

What would settle it

A concrete CR-manifold of arbitrary codimension whose measured Levi form, contact form or depth cannot be matched to any algebraic property or diagram feature of its associated CR-algebra would falsify the claimed correspondences.

read the original abstract

We study CR-manifolds of arbitrary CR codimension, mainly focusing on Levi and contact-nondegeneracy and depth. We investigate these and other invariants in the locally homogeneous case, developing a comprehensive theory which establishes correspondences with related properties of the associated CR-algebras and, in the parabolic case, with the combinatorics of their cross-marked painted root diagrams.

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 links CR nondegeneracy and depth to CR-algebra properties with a combinatorial encoding via cross-marked painted root diagrams in the parabolic homogeneous case.

read the letter

The paper develops correspondences between contact and Levi-nondegeneracy conditions on CR-manifolds of arbitrary codimension and properties of their CR-algebras. In the parabolic homogeneous case, it ties these to the combinatorics of cross-marked painted root diagrams. This link to root diagrams looks like the genuinely new element. It organizes the invariants in a way that prior CR literature did not emphasize as directly. The setup handles arbitrary codimension cleanly, which is a plus for the algebraic approach. The soft spot is the restriction to locally homogeneous manifolds. The invariants are studied through the CR-algebra structure, but general CR-manifolds may not reduce to this without extra assumptions. The abstract does not include sample calculations or explicit diagrams, so the practical utility depends on how detailed the full text gets. If the derivations are there and check out, the limitation is minor for the stated scope. This is for specialists in CR geometry and several complex variables who already work with homogeneous models or root systems. A reader looking for tools to classify or compute invariants in the parabolic setting would find it relevant. It is not likely to change how people approach non-homogeneous cases right away. I would send it to peer review. The algebraic framing is coherent enough to merit referee input on the details and to see if the correspondences hold up under scrutiny.

Referee Report

0 major / 4 minor

Summary. The paper studies CR-manifolds of arbitrary codimension, with primary focus on the invariants of Levi-nondegeneracy, contact-nondegeneracy, and depth. It develops a comprehensive algebraic theory in the locally homogeneous case that establishes correspondences between these invariants and properties of the associated CR-algebras; in the parabolic setting these correspondences are further encoded combinatorially via cross-marked painted root diagrams.

Significance. If the stated correspondences hold, the work supplies a concrete algebraic and combinatorial toolkit for classifying and analyzing homogeneous CR structures, linking differential-geometric invariants directly to Lie-algebra data and root-system combinatorics. The explicit restriction to the locally homogeneous case keeps the claims appropriately scoped; the combinatorial encoding in the parabolic case is a clear strength when the maps are rigorously constructed.

minor comments (4)

Abstract: the phrase 'comprehensive theory' should be replaced by a more precise statement of the main theorems or correspondences proved, to avoid overstatement.
Introduction: add a short paragraph situating the new correspondences against existing results on Levi-nondegenerate CR structures (e.g., works on Tanaka prolongation or parabolic geometries) so readers can gauge novelty.
Notation section: define 'depth' and 'finitely Levi-nondegenerate' explicitly before their first use, and clarify whether these notions coincide with or differ from the standard definitions in the CR literature.
Figure captions (if any diagrams of painted root systems appear): ensure each caption states the precise correspondence being illustrated rather than only the diagram itself.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive and accurate summary of our manuscript, as well as for recognizing the significance of the algebraic and combinatorial correspondences we establish. We appreciate the recommendation for minor revision.

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper develops a theoretical framework establishing algebraic correspondences between CR invariants (Levi-nondegeneracy, contact-nondegeneracy, depth) and properties of associated CR-algebras, including combinatorial encodings via cross-marked painted root diagrams in the parabolic case. All steps rely on standard Lie algebra theory and direct constructions in the locally homogeneous setting without any reduction of claims to self-definitions, fitted parameters renamed as predictions, or load-bearing self-citations. The derivation chain is self-contained within the stated scope of correspondences and does not invoke unverified uniqueness theorems or ansatzes from prior author work.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

No free parameters, axioms, or invented entities can be identified from the abstract alone; the work appears to rely on standard background in CR geometry and Lie theory.

pith-pipeline@v0.9.0 · 5344 in / 1008 out tokens · 33011 ms · 2026-05-16T22:24:05.164279+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

42 extracted references · 42 canonical work pages

[1]

Alekseev and S.O

I.P. Alekseev and S.O. Ivanov,Higher Jacobi identities, arXiv: Group Theory (2016), 1–7

work page 2016
[2]

Altomani, C

A. Altomani, C. D. Hill, M. Nacinovich, and E. Porten,Complex vector fields and hypoelliptic partial differential operators, Annales de l’Institut Fourier60(2010), no. 3, 987–1034

work page 2010
[3]

Altomani, C

A. Altomani, C. Medori, and M. Nacinovich,The CR structure of minimal orbits in complex flag manifolds, J. Lie Theory16(2006), no. 3, 483–530. MR MR2248142 (2007c:32043)

work page 2006
[4]

,Orbits of real forms in complex flag manifolds, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)9(2010), no. 1, 69–109. MR 2668874

work page 2010
[5]

Groups18 (2013), no

,Reductive compact homogeneous CR manifolds, Transform. Groups18 (2013), no. 2, 289–328. MR 3055768

work page 2013
[6]

Baouendi, P

M.S. Baouendi, P. Ebenfelt, and L.P. Rothschild,Real submanifolds in complex space and their mappings, Princeton Mathematical Series47(1999), xii+404

work page 1999
[7]

Blessenohl and H

D. Blessenohl and H. Laue,Algebraic combinatorics related to the free Lie algebra, S´eminaire Lotharingien de Combinatoire (Thurnau, 1992), Pr´epubl. Inst. Rech. Math. Av., vol. 1993/33, Univ. Louis Pasteur, Strasbourg, 1993, pp. 1–21. MR 1311252

work page 1992
[8]

Bourbaki,Lie groups and Lie algebras

N. Bourbaki,Lie groups and Lie algebras. Chapters 4–6, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2002, Translated from the 1968 French original by Andrew Pressley. MR 1890629

work page 2002
[9]

Chapters 7–9, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2005, Translated from the 1975 and 1982 French originals by Andrew Pressley

,Lie groups and Lie algebras. Chapters 7–9, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2005, Translated from the 1975 and 1982 French originals by Andrew Pressley. MR 2109105

work page 2005
[10]

Brinkschulte, C

J. Brinkschulte, C. D. Hill, J. Leiterer, and M. Nacinovich,Aspects of the Levi form, Boll. Unione Mat. Ital.13(2020), no. 1, 71–89. MR 4060511

work page 2020
[11]

Doubrov, A

B. Doubrov, A. Medvedev, and D. The,Homogeneous Levi non-degenerate hyper- surfaces inC 3, Math. Z.297(2021), 669–709

work page 2021
[12]

Freeman,Real submanifolds with degenerate levi form, Proceedings of Symposia in Pure Mathematics, vol

M. Freeman,Real submanifolds with degenerate levi form, Proceedings of Symposia in Pure Mathematics, vol. 30, pp. 141–147, American Mathematical Society, Provi- dence, RI, 1977

work page 1977
[13]

V . V . Gorbatsevich, A. L. Onishchik, and E. B. Vinberg,Structure of lie groups and lie algebras, Springer-Verlag, Berlin, 1994, Translated from the Russian by A. Ko- zlowski,. MR MR1631937 (99c:22009)

work page 1994
[14]

Gregorovi ˇc,On equivalence problem for 2–nondegenerate CR geometries with sim- ple models, Adv

J. Gregorovi ˇc,On equivalence problem for 2–nondegenerate CR geometries with sim- ple models, Adv. Math.384(2021), 107718, 35 pp

work page 2021
[15]

C. D. Hill, J. Merker, Z. Nie, and P. Nurowski,Accidental CR structures, Transfor- mation Groups (2025), 51 pp., Published online: 10 January 2025

work page 2025
[16]

C. D. Hill and M. Nacinovich,A weak pseudoconcavity condition for abstract al- most CR manifolds, Invent. Math.142(2000), no. 2, 251–283. MR 1794063 (2002b:32055)

work page 2000
[17]

Isaev and D

A. Isaev and D. Zaitsev,Reduction of five-dimensional uniformly Levi degenerate CR structures to absolute parallelisms, J. Geom. Anal.23(2013), 1571–1605

work page 2013
[18]

Kobayashi and K

S. Kobayashi and K. Nomizu,Foundations of differential geometry 2, Wiley inter- science, 1963. 80 S.MARINI, C.MEDORI, M.NACINOVICH

work page 1963
[19]

Kol `a˘r, I

M. Kol `a˘r, I. Kossovskiy, and D. Sykes,New examples of 2-nondegenerate real hyper- surfaces inC N with arbitrary nilpotent symbols, J. Lond. Math. Soc. (2)110(2024), no. 2, e12962, 36 pp

work page 2024
[20]

Kruglikov and A

B. Kruglikov and A. Santi,On 3-nondegenerate CR manifolds in dimension 7 (I): The transitive case, J. Reine Angew. Math.820(2025), 167–211

work page 2025
[21]

Marini and C

S. Marini and C. Medori,On homogeneous CR manifolds of arbitrary order of Levi nondegeneracy, arXiv preprint (2025), 15 pp

work page 2025
[22]

Marini, C

S. Marini, C. Medori, and M. Nacinovich,L-prolongations of graded lie algebras, Geometriae Dedicata207(2020), no. 1, 229–252, Published online: 15 January 2020

work page 2020
[23]

1, 45–71

,On some classes ofZ-graded Lie algebras, Abhandlungen aus dem Mathe- matischen Seminar der Universit¨at Hamburg90(2020), no. 1, 45–71

work page 2020
[24]

Z.299 (2021), no

,Higher order Levi forms on homogeneous CR manifolds, Math. Z.299 (2021), no. 1-2, 563–589

work page 2021
[25]

6, 2715–2747

,On finitely nondegenerate closed homogeneous CR manifolds, Annali di Matematica Pura e Applicata202(2023), no. 6, 2715–2747

work page 2023
[26]

Math.42(2024), no

,Root involutions, real forms and diagrams, Expo. Math.42(2024), no. 5, Paper No. 125593, 67 pp

work page 2024
[27]

Marini, C

S. Marini, C. Medori, M. Nacinovich, and A. Spiro,On transitive contact and CR algebras, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)XX(2020), no. 2, 771–795

work page 2020
[28]

Medori and M

C. Medori and M. Nacinovich,Levi-Tanaka algebras and homogeneous CR mani- folds, Compositio Math.109(1997), no. 2, 195–250. MR MR1478818 (99d:32007)

work page 1997
[29]

,Classification of semisimple Levi-Tanaka algebras, Ann. Mat. Pura Appl. (4)174(1998), 285–349. MR MR1746933 (2001e:17037)

work page 1998
[30]

1, 89–95

,Maximally homogeneous nondegenerate CR manifolds, Advances in Geom- etry1(2001), no. 1, 89–95

work page 2001
[31]

Algebra287(2005), no

,Algebras of infinitesimal CR automorphisms, J. Algebra287(2005), no. 1, 234–274. MR MR2134266 (2006a:32043)

work page 2005
[32]

Medori and A

C. Medori and A. Spiro,The equivalence problem for five-dimensional Levi degener- ate CR manifolds, Int. Math. Res. Not. IMRN (2014), no. 20, 5602–5647

work page 2014
[33]

,Structure equations of Levi degenerate CR hypersurfaces of uniform type, Rend. Semin. Mat. Univ. Politec. Torino73(2015), 127–150

work page 2015
[34]

Merker and S

J. Merker and S. Pocchiola,Explicit absolute parallelism for 2-nondegenerate real hypersurfaces M⊂C 3 of constant Levi rank 1, J. Geom. Anal.30(2020), 3233– 3242

work page 2020
[35]

Nacinovich and E

M. Nacinovich and E. Porten,C ∞-hypoellipticity and extension of CR functions, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)14(2015), no. 3, 677–703. MR 3445197

work page 2015
[36]

Reutenauer,Free Lie algebras, London Mathematical Society Monographs

C. Reutenauer,Free Lie algebras, London Mathematical Society Monographs. New Series, vol. 7, The Clarendon Press, Oxford University Press, New York, 1993, Ox- ford Science Publications. MR 1231799

work page 1993
[37]

Sykes,Homogeneous 2-nondegenerate CR manifolds of hypersurface type in low dimensions, Indiana University Mathematics Journal74(2025), no

D. Sykes,Homogeneous 2-nondegenerate CR manifolds of hypersurface type in low dimensions, Indiana University Mathematics Journal74(2025), no. 2, 279–319

work page 2025
[38]

Sykes and I

D. Sykes and I. Zelenko,On geometry of 2-nondegenerate CR structures of hypersur- face type and flag structures on leaf spaces of Levi foliations, Adv. Math.413(2023), 108850, 65 pp

work page 2023
[39]

Tanaka,On generalized graded Lie algebras and geometric structures

N. Tanaka,On generalized graded Lie algebras and geometric structures. I, J. Math. Soc. Japan19(1967), 215–254. MR MR0221418 (36 #4470)

work page 1967
[40]

,On differential systems, graded Lie algebras and pseudogroups, J. Math. Kyoto Univ.10(1970), 1–82. MR MR0266258 (42 #1165)

work page 1970
[41]

Varadarajan,Lie groups, lie algebras and their representations, Graduate Texts in Mathematics, Springer Verlag, New York, NY , 1974

V .S. Varadarajan,Lie groups, lie algebras and their representations, Graduate Texts in Mathematics, Springer Verlag, New York, NY , 1974. ON CONTACT AND FINITELY LEVI-NONDEGENERATECRALGEBRAS 81

work page 1974
[42]

TorVerga- ta

J. A. Wolf,The action of a real semisimple group on a complex flag manifold. I. Orbit structure and holomorphic arc components, Bull. Amer. Math. Soc.75(1969), 1121–1237. StefanoMarini: Dipartimento diScienzeMatematiche, Fisiche eInformatiche, Uni- versit`a diParma, ParcoArea delleScienze53/A (Campus), 43124 Parma(Italy) Email address:stefano.marini@unipr...

work page 1969

[1] [1]

Alekseev and S.O

I.P. Alekseev and S.O. Ivanov,Higher Jacobi identities, arXiv: Group Theory (2016), 1–7

work page 2016

[2] [2]

Altomani, C

A. Altomani, C. D. Hill, M. Nacinovich, and E. Porten,Complex vector fields and hypoelliptic partial differential operators, Annales de l’Institut Fourier60(2010), no. 3, 987–1034

work page 2010

[3] [3]

Altomani, C

A. Altomani, C. Medori, and M. Nacinovich,The CR structure of minimal orbits in complex flag manifolds, J. Lie Theory16(2006), no. 3, 483–530. MR MR2248142 (2007c:32043)

work page 2006

[4] [4]

,Orbits of real forms in complex flag manifolds, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)9(2010), no. 1, 69–109. MR 2668874

work page 2010

[5] [5]

Groups18 (2013), no

,Reductive compact homogeneous CR manifolds, Transform. Groups18 (2013), no. 2, 289–328. MR 3055768

work page 2013

[6] [6]

Baouendi, P

M.S. Baouendi, P. Ebenfelt, and L.P. Rothschild,Real submanifolds in complex space and their mappings, Princeton Mathematical Series47(1999), xii+404

work page 1999

[7] [7]

Blessenohl and H

D. Blessenohl and H. Laue,Algebraic combinatorics related to the free Lie algebra, S´eminaire Lotharingien de Combinatoire (Thurnau, 1992), Pr´epubl. Inst. Rech. Math. Av., vol. 1993/33, Univ. Louis Pasteur, Strasbourg, 1993, pp. 1–21. MR 1311252

work page 1992

[8] [8]

Bourbaki,Lie groups and Lie algebras

N. Bourbaki,Lie groups and Lie algebras. Chapters 4–6, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2002, Translated from the 1968 French original by Andrew Pressley. MR 1890629

work page 2002

[9] [9]

Chapters 7–9, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2005, Translated from the 1975 and 1982 French originals by Andrew Pressley

,Lie groups and Lie algebras. Chapters 7–9, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 2005, Translated from the 1975 and 1982 French originals by Andrew Pressley. MR 2109105

work page 2005

[10] [10]

Brinkschulte, C

J. Brinkschulte, C. D. Hill, J. Leiterer, and M. Nacinovich,Aspects of the Levi form, Boll. Unione Mat. Ital.13(2020), no. 1, 71–89. MR 4060511

work page 2020

[11] [11]

Doubrov, A

B. Doubrov, A. Medvedev, and D. The,Homogeneous Levi non-degenerate hyper- surfaces inC 3, Math. Z.297(2021), 669–709

work page 2021

[12] [12]

Freeman,Real submanifolds with degenerate levi form, Proceedings of Symposia in Pure Mathematics, vol

M. Freeman,Real submanifolds with degenerate levi form, Proceedings of Symposia in Pure Mathematics, vol. 30, pp. 141–147, American Mathematical Society, Provi- dence, RI, 1977

work page 1977

[13] [13]

V . V . Gorbatsevich, A. L. Onishchik, and E. B. Vinberg,Structure of lie groups and lie algebras, Springer-Verlag, Berlin, 1994, Translated from the Russian by A. Ko- zlowski,. MR MR1631937 (99c:22009)

work page 1994

[14] [14]

Gregorovi ˇc,On equivalence problem for 2–nondegenerate CR geometries with sim- ple models, Adv

J. Gregorovi ˇc,On equivalence problem for 2–nondegenerate CR geometries with sim- ple models, Adv. Math.384(2021), 107718, 35 pp

work page 2021

[15] [15]

C. D. Hill, J. Merker, Z. Nie, and P. Nurowski,Accidental CR structures, Transfor- mation Groups (2025), 51 pp., Published online: 10 January 2025

work page 2025

[16] [16]

C. D. Hill and M. Nacinovich,A weak pseudoconcavity condition for abstract al- most CR manifolds, Invent. Math.142(2000), no. 2, 251–283. MR 1794063 (2002b:32055)

work page 2000

[17] [17]

Isaev and D

A. Isaev and D. Zaitsev,Reduction of five-dimensional uniformly Levi degenerate CR structures to absolute parallelisms, J. Geom. Anal.23(2013), 1571–1605

work page 2013

[18] [18]

Kobayashi and K

S. Kobayashi and K. Nomizu,Foundations of differential geometry 2, Wiley inter- science, 1963. 80 S.MARINI, C.MEDORI, M.NACINOVICH

work page 1963

[19] [19]

Kol `a˘r, I

M. Kol `a˘r, I. Kossovskiy, and D. Sykes,New examples of 2-nondegenerate real hyper- surfaces inC N with arbitrary nilpotent symbols, J. Lond. Math. Soc. (2)110(2024), no. 2, e12962, 36 pp

work page 2024

[20] [20]

Kruglikov and A

B. Kruglikov and A. Santi,On 3-nondegenerate CR manifolds in dimension 7 (I): The transitive case, J. Reine Angew. Math.820(2025), 167–211

work page 2025

[21] [21]

Marini and C

S. Marini and C. Medori,On homogeneous CR manifolds of arbitrary order of Levi nondegeneracy, arXiv preprint (2025), 15 pp

work page 2025

[22] [22]

Marini, C

S. Marini, C. Medori, and M. Nacinovich,L-prolongations of graded lie algebras, Geometriae Dedicata207(2020), no. 1, 229–252, Published online: 15 January 2020

work page 2020

[23] [23]

1, 45–71

,On some classes ofZ-graded Lie algebras, Abhandlungen aus dem Mathe- matischen Seminar der Universit¨at Hamburg90(2020), no. 1, 45–71

work page 2020

[24] [24]

Z.299 (2021), no

,Higher order Levi forms on homogeneous CR manifolds, Math. Z.299 (2021), no. 1-2, 563–589

work page 2021

[25] [25]

6, 2715–2747

,On finitely nondegenerate closed homogeneous CR manifolds, Annali di Matematica Pura e Applicata202(2023), no. 6, 2715–2747

work page 2023

[26] [26]

Math.42(2024), no

,Root involutions, real forms and diagrams, Expo. Math.42(2024), no. 5, Paper No. 125593, 67 pp

work page 2024

[27] [27]

Marini, C

S. Marini, C. Medori, M. Nacinovich, and A. Spiro,On transitive contact and CR algebras, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)XX(2020), no. 2, 771–795

work page 2020

[28] [28]

Medori and M

C. Medori and M. Nacinovich,Levi-Tanaka algebras and homogeneous CR mani- folds, Compositio Math.109(1997), no. 2, 195–250. MR MR1478818 (99d:32007)

work page 1997

[29] [29]

,Classification of semisimple Levi-Tanaka algebras, Ann. Mat. Pura Appl. (4)174(1998), 285–349. MR MR1746933 (2001e:17037)

work page 1998

[30] [30]

1, 89–95

,Maximally homogeneous nondegenerate CR manifolds, Advances in Geom- etry1(2001), no. 1, 89–95

work page 2001

[31] [31]

Algebra287(2005), no

,Algebras of infinitesimal CR automorphisms, J. Algebra287(2005), no. 1, 234–274. MR MR2134266 (2006a:32043)

work page 2005

[32] [32]

Medori and A

C. Medori and A. Spiro,The equivalence problem for five-dimensional Levi degener- ate CR manifolds, Int. Math. Res. Not. IMRN (2014), no. 20, 5602–5647

work page 2014

[33] [33]

,Structure equations of Levi degenerate CR hypersurfaces of uniform type, Rend. Semin. Mat. Univ. Politec. Torino73(2015), 127–150

work page 2015

[34] [34]

Merker and S

J. Merker and S. Pocchiola,Explicit absolute parallelism for 2-nondegenerate real hypersurfaces M⊂C 3 of constant Levi rank 1, J. Geom. Anal.30(2020), 3233– 3242

work page 2020

[35] [35]

Nacinovich and E

M. Nacinovich and E. Porten,C ∞-hypoellipticity and extension of CR functions, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)14(2015), no. 3, 677–703. MR 3445197

work page 2015

[36] [36]

Reutenauer,Free Lie algebras, London Mathematical Society Monographs

C. Reutenauer,Free Lie algebras, London Mathematical Society Monographs. New Series, vol. 7, The Clarendon Press, Oxford University Press, New York, 1993, Ox- ford Science Publications. MR 1231799

work page 1993

[37] [37]

Sykes,Homogeneous 2-nondegenerate CR manifolds of hypersurface type in low dimensions, Indiana University Mathematics Journal74(2025), no

D. Sykes,Homogeneous 2-nondegenerate CR manifolds of hypersurface type in low dimensions, Indiana University Mathematics Journal74(2025), no. 2, 279–319

work page 2025

[38] [38]

Sykes and I

D. Sykes and I. Zelenko,On geometry of 2-nondegenerate CR structures of hypersur- face type and flag structures on leaf spaces of Levi foliations, Adv. Math.413(2023), 108850, 65 pp

work page 2023

[39] [39]

Tanaka,On generalized graded Lie algebras and geometric structures

N. Tanaka,On generalized graded Lie algebras and geometric structures. I, J. Math. Soc. Japan19(1967), 215–254. MR MR0221418 (36 #4470)

work page 1967

[40] [40]

,On differential systems, graded Lie algebras and pseudogroups, J. Math. Kyoto Univ.10(1970), 1–82. MR MR0266258 (42 #1165)

work page 1970

[41] [41]

Varadarajan,Lie groups, lie algebras and their representations, Graduate Texts in Mathematics, Springer Verlag, New York, NY , 1974

V .S. Varadarajan,Lie groups, lie algebras and their representations, Graduate Texts in Mathematics, Springer Verlag, New York, NY , 1974. ON CONTACT AND FINITELY LEVI-NONDEGENERATECRALGEBRAS 81

work page 1974

[42] [42]

TorVerga- ta

J. A. Wolf,The action of a real semisimple group on a complex flag manifold. I. Orbit structure and holomorphic arc components, Bull. Amer. Math. Soc.75(1969), 1121–1237. StefanoMarini: Dipartimento diScienzeMatematiche, Fisiche eInformatiche, Uni- versit`a diParma, ParcoArea delleScienze53/A (Campus), 43124 Parma(Italy) Email address:stefano.marini@unipr...

work page 1969