Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $

Jöel Merker; Wei Foo

doi:10.33205/cma.943426

Araştırma Makalesi

Yıl 2021, Cilt: 4 Sayı: 3, 318 - 377, 16.09.2021

Jöel Merker , Wei Foo

https://doi.org/10.33205/cma.943426

Cited By: 1

Öz

Kaynakça

Z. Chen, W. G. Foo, J. Merker and T. A. Ta: Normal forms for rigid C2;1 hypersurfaces $M_5\subset \mathbb{C}_3$, Taiwanese Journal of Mathematics, 25 (2) (2021), 333–364, arxiv.org/abs/1912.01655/
Z. Chen, J. Merker: On differential invariants of parabolic surfaces, Dissertationes Mathematicæ, 559 (2021), 110 pages, arxiv.org/abs/1908.07867/
M. Fels, W. Kaup: CR manifolds of dimension 5: a Lie algebra approach, J. Reine Angew. Math., 604 (2007), 47–71.
M. Fels, W. Kaup: Classification of Levi degenerate homogeneous CR-manifolds in dimension 5, Acta Math., 201 (2008), 1–82.
W. G. Foo, J. Merker and T. A. Ta: Rigid equivalences of 5-dimensional 2-nondegenerate rigid real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, Michigan Math. J., to appear, arxiv.org/abs/1904.02562/.
M. Freeman: Real submanifolds with degenerate Levi form. Several complex variables (Proc. Sympos. Pure Math., Vol. XXX, Williams Coll., Williamstown, Mass., 1975), Part 1, pp. 141–147. Amer. Math. Soc., Providence, R.I., 1977.
M. Freeman: Local biholomorphic straightening of real submanifolds, Annals of Mathematics, 106 (2) (1977), 319–352.
H. Gaussier, J. Merker: A new example of uniformly Levi degenerate hypersurface in $\mathbb{C}_3$, Ark. Mat., 41 (1) (2003), 85–94. Erratum: 45 (2) (2007), 269–271.
A. Isaev: Zero CR-Curvature Equations for Levi Degenerate Hypersurfaces via Pocchiola’s Invariant, arxiv.org/pdf/1809.03029/
H. Jacobowitz: An introduction to CR structures, Math. Surveys and Monographs, 32, Amer. Math. Soc., Providence (1990).
S. Lie (Author), J. Merker (Editor): Theory of Transformation Groups I. General Properties of Continuous Transformation Groups. A Contemporary Approach and Translation, Springer-Verlag, Berlin, Heidelberg (2015), arxiv.org/abs/1003.3202/
C. Medori, A. Spiro: The equivalence problem for 5-dimensional Levi degenerate CR manifolds, Int. Math. Res. Not. IMRN, 2014 (20), 5602–5647.
C. Medori, A. Spiro: Structure equations of Levi degenerate CR hypersurfaces of uniform type, Rend. Semin. Mat. Univ. Politec. Torino, 73 (1–2) (2015), 127–150.
J. Merker, P. Nurowski: On degenerate para-CR structures: Cartan reduction and homogeneous models, arxiv.org/abs/2003.08166/ (2020).
J. Merker: Lie symmetries of partial differential equations and CR geometry, Journal of Mathematical Sciences (N.Y.), 154 (2008), 817–922.
J. Merker: Equivalences of 5-dimensional CR manifolds, IV: Six ambiguity matrix groups (Initial G-structures), arxiv.org/abs/1312.1084/
J. Merker: Equivalences of 5-dimensional CR-manifolds V: Six initial frames and coframes; Explicitness obstacles, arxiv.org/abs/1312.3581/
J. Merker, S. Pocchiola: Explicit absolute parallelism for 2-nondegenerate real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, Journal of Geometric Analysis, 30 (2020), 2689–2730, 10.1007/s12220-018-9988-3. Addendum: 3233–3242, 10.1007/s12220-019-00195-2.
J. Merker, S. Pocchiola and M. Sabzevari: Equivalences of 5-dimensional CR manifolds, II: General classes I, II, III1, III2, IV1, IV2, 5 figures, 95 pages, arxiv.org/abs/1311.5669/
P. Nurowski, J. Tafel: Symmetries of Cauchy-Riemann spaces, Lett. Math. Phys., 15 (1) (1988), 31–38.
P. J. Olver: Equivalence, Invariants, and Symmetry, Cambridge University Press, Cambridge, (1995).
P. J. Olver: Normal forms for submanifolds under group actions, Symmetries, differential equations and applications, 1–25. Springer Proc. Math. Stat. 266, Springer, Cham, (2018).
P. J. Olver, J. Pohjanpelto: Moving frames for Lie pseudo-groups, Canad. J. Math., 60 (6) (2008), 1336–1386.
P. J. Olver, J. Pohjanpelto: Differential invariant algebras of Lie pseudo-groups, Adv. Math., 222 (5) (2009), 1746–1792.
S. Pocchiola: Explicit absolute parallelism for 2-nondegenerate real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, arxiv.org/abs/1312.6400/

Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $

Yıl 2021, Cilt: 4 Sayı: 3, 318 - 377, 16.09.2021

Jöel Merker , Wei Foo

https://doi.org/10.33205/cma.943426

Cited By: 1

Öz

The class $IV2\sf IV2$ of $2$ -nondegenerate constant Levi rank $1$ hypersurfaces $M^{5} \subset C^{3}$ is governed by Pocchiola's two primary invariants $W_{0}$ and $J_{0}$ . Their vanishing characterizes equivalence of such a hypersurface $M^{5}$ to the tube $M_{L C}^{5}$ over the real light cone in $R^{3}$ . When either $W_{0} \equiv̸ 0$ or $J_{0} \equiv̸ 0$ , by normalization of certain two group parameters $c$ and $e$ , an invariant coframe can be built on $M^{5}$ , showing that the dimension of the CR automorphism group drops from $10$ to $5$ . This paper constructs an explicit ${e}$ -structure in case $W_{0}$ and $J_{0}$ do not necessarily vanish. Furthermore, Pocchiola's calculations hidden on a computer now appear in details, especially the determination of a secondary invariant $R$ , expressed in terms of the first jet of $W_{0}$ . All other secondary invariants of the ${e}$ -structure are also expressed explicitly in terms of $W_{0}$ and $J_{0}$ .

Anahtar Kelimeler

Levi degenerate CR manifolds, 2-nondegeneracy, G-structures, Cartan method of equivalence, Cartan Lemma, Pocchiola invariants

Kaynakça

Z. Chen, W. G. Foo, J. Merker and T. A. Ta: Normal forms for rigid C2;1 hypersurfaces $M_5\subset \mathbb{C}_3$, Taiwanese Journal of Mathematics, 25 (2) (2021), 333–364, arxiv.org/abs/1912.01655/
Z. Chen, J. Merker: On differential invariants of parabolic surfaces, Dissertationes Mathematicæ, 559 (2021), 110 pages, arxiv.org/abs/1908.07867/
M. Fels, W. Kaup: CR manifolds of dimension 5: a Lie algebra approach, J. Reine Angew. Math., 604 (2007), 47–71.
M. Fels, W. Kaup: Classification of Levi degenerate homogeneous CR-manifolds in dimension 5, Acta Math., 201 (2008), 1–82.
W. G. Foo, J. Merker and T. A. Ta: Rigid equivalences of 5-dimensional 2-nondegenerate rigid real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, Michigan Math. J., to appear, arxiv.org/abs/1904.02562/.
M. Freeman: Real submanifolds with degenerate Levi form. Several complex variables (Proc. Sympos. Pure Math., Vol. XXX, Williams Coll., Williamstown, Mass., 1975), Part 1, pp. 141–147. Amer. Math. Soc., Providence, R.I., 1977.
M. Freeman: Local biholomorphic straightening of real submanifolds, Annals of Mathematics, 106 (2) (1977), 319–352.
H. Gaussier, J. Merker: A new example of uniformly Levi degenerate hypersurface in $\mathbb{C}_3$, Ark. Mat., 41 (1) (2003), 85–94. Erratum: 45 (2) (2007), 269–271.
A. Isaev: Zero CR-Curvature Equations for Levi Degenerate Hypersurfaces via Pocchiola’s Invariant, arxiv.org/pdf/1809.03029/
H. Jacobowitz: An introduction to CR structures, Math. Surveys and Monographs, 32, Amer. Math. Soc., Providence (1990).
S. Lie (Author), J. Merker (Editor): Theory of Transformation Groups I. General Properties of Continuous Transformation Groups. A Contemporary Approach and Translation, Springer-Verlag, Berlin, Heidelberg (2015), arxiv.org/abs/1003.3202/
C. Medori, A. Spiro: The equivalence problem for 5-dimensional Levi degenerate CR manifolds, Int. Math. Res. Not. IMRN, 2014 (20), 5602–5647.
C. Medori, A. Spiro: Structure equations of Levi degenerate CR hypersurfaces of uniform type, Rend. Semin. Mat. Univ. Politec. Torino, 73 (1–2) (2015), 127–150.
J. Merker, P. Nurowski: On degenerate para-CR structures: Cartan reduction and homogeneous models, arxiv.org/abs/2003.08166/ (2020).
J. Merker: Lie symmetries of partial differential equations and CR geometry, Journal of Mathematical Sciences (N.Y.), 154 (2008), 817–922.
J. Merker: Equivalences of 5-dimensional CR manifolds, IV: Six ambiguity matrix groups (Initial G-structures), arxiv.org/abs/1312.1084/
J. Merker: Equivalences of 5-dimensional CR-manifolds V: Six initial frames and coframes; Explicitness obstacles, arxiv.org/abs/1312.3581/
J. Merker, S. Pocchiola: Explicit absolute parallelism for 2-nondegenerate real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, Journal of Geometric Analysis, 30 (2020), 2689–2730, 10.1007/s12220-018-9988-3. Addendum: 3233–3242, 10.1007/s12220-019-00195-2.
J. Merker, S. Pocchiola and M. Sabzevari: Equivalences of 5-dimensional CR manifolds, II: General classes I, II, III1, III2, IV1, IV2, 5 figures, 95 pages, arxiv.org/abs/1311.5669/
P. Nurowski, J. Tafel: Symmetries of Cauchy-Riemann spaces, Lett. Math. Phys., 15 (1) (1988), 31–38.
P. J. Olver: Equivalence, Invariants, and Symmetry, Cambridge University Press, Cambridge, (1995).
P. J. Olver: Normal forms for submanifolds under group actions, Symmetries, differential equations and applications, 1–25. Springer Proc. Math. Stat. 266, Springer, Cham, (2018).
P. J. Olver, J. Pohjanpelto: Moving frames for Lie pseudo-groups, Canad. J. Math., 60 (6) (2008), 1336–1386.
P. J. Olver, J. Pohjanpelto: Differential invariant algebras of Lie pseudo-groups, Adv. Math., 222 (5) (2009), 1746–1792.
S. Pocchiola: Explicit absolute parallelism for 2-nondegenerate real hypersurfaces $M_5\subset \mathbb{C}_3$ of constant Levi rank 1, arxiv.org/abs/1312.6400/

Toplam 25 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Matematik
Bölüm	Makaleler
Yazarlar	Jöel Merker 0000-0003-2653-2147 Wei Foo Bu kişi benim 0000-0002-9022-8177
Yayımlanma Tarihi	16 Eylül 2021
Yayımlandığı Sayı	Yıl 2021 Cilt: 4 Sayı: 3

Kaynak Göster

APA	Merker, J., & Foo, W. (2021). Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $. Constructive Mathematical Analysis, 4(3), 318-377. https://doi.org/10.33205/cma.943426
AMA	Merker J, Foo W. Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $. CMA. Eylül 2021;4(3):318-377. doi:10.33205/cma.943426
Chicago	Merker, Jöel, ve Wei Foo. “Differentiall $ {e} $-Structures for Equivalences of $ 2 $-Nondegenerate Levi Rank $ 1 $ Hypersurfaces $ M_5 ⊂ \mathbb{C} $”. Constructive Mathematical Analysis 4, sy. 3 (Eylül 2021): 318-77. https://doi.org/10.33205/cma.943426.
EndNote	Merker J, Foo W (01 Eylül 2021) Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $. Constructive Mathematical Analysis 4 3 318–377.
IEEE	J. Merker ve W. Foo, “Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $”, CMA, c. 4, sy. 3, ss. 318–377, 2021, doi: 10.33205/cma.943426.
ISNAD	Merker, Jöel - Foo, Wei. “Differentiall $ {e} $-Structures for Equivalences of $ 2 $-Nondegenerate Levi Rank $ 1 $ Hypersurfaces $ M_5 ⊂ \mathbb{C} $”. Constructive Mathematical Analysis 4/3 (Eylül 2021), 318-377. https://doi.org/10.33205/cma.943426.
JAMA	Merker J, Foo W. Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $. CMA. 2021;4:318–377.
MLA	Merker, Jöel ve Wei Foo. “Differentiall $ {e} $-Structures for Equivalences of $ 2 $-Nondegenerate Levi Rank $ 1 $ Hypersurfaces $ M_5 ⊂ \mathbb{C} $”. Constructive Mathematical Analysis, c. 4, sy. 3, 2021, ss. 318-77, doi:10.33205/cma.943426.
Vancouver	Merker J, Foo W. Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $. CMA. 2021;4(3):318-77.

Constructive Mathematical Analysis

Öz

Kaynakça

Differentiall $ {e} $-structures for equivalences of $ 2 $-nondegenerate Levi rank $ 1 $ hypersurfaces $ M_5 ⊂ \mathbb{C} $

Öz

Anahtar Kelimeler

Kaynakça

Ayrıntılar

Kaynak Göster

Cited By

On Degenerate Para-CR Structures: Cartan Reduction and Homogeneous Models

Transformation Groups

https://doi.org/10.1007/s00031-022-09746-4