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The purpose of this note is to compare the properties of the symbolic pseudo-differential calculus on the Heisenberg and on the Engel groups; nilpotent Lie groups of 2-step and 3-step, respectively. Here we provide a preliminary analysis of the structure and of the symbolic calculus with symbols parametrized by (λ, μ) on the Engel group, while for the case of the Heisenberg group we recall the analogous results on the λ-classes of symbols.

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MLA
Chatzakou, Marianna. “On (λ,μ)-Classes on the Engel Group.” Advances in Harmonic Analysis and Partial Differential Equations, edited by Vladimir Georgiev et al., Springer, 2020, pp. 37–49, doi:10.1007/978-3-030-58215-9_2.
APA
Chatzakou, M. (2020). On (λ,μ)-classes on the Engel group. In V. Georgiev, T. Ozawa, M. Ruzhansky, & J. Wirth (Eds.), Advances in harmonic analysis and partial differential equations (pp. 37–49). https://doi.org/10.1007/978-3-030-58215-9_2
Chicago author-date
Chatzakou, Marianna. 2020. “On (λ,μ)-Classes on the Engel Group.” In Advances in Harmonic Analysis and Partial Differential Equations, edited by Vladimir Georgiev, Tohru Ozawa, Michael Ruzhansky, and Jens Wirth, 37–49. Springer. https://doi.org/10.1007/978-3-030-58215-9_2.
Chicago author-date (all authors)
Chatzakou, Marianna. 2020. “On (λ,μ)-Classes on the Engel Group.” In Advances in Harmonic Analysis and Partial Differential Equations, ed by. Vladimir Georgiev, Tohru Ozawa, Michael Ruzhansky, and Jens Wirth, 37–49. Springer. doi:10.1007/978-3-030-58215-9_2.
Vancouver
1.
Chatzakou M. On (λ,μ)-classes on the Engel group. In: Georgiev V, Ozawa T, Ruzhansky M, Wirth J, editors. Advances in harmonic analysis and partial differential equations. Springer; 2020. p. 37–49.
IEEE
[1]
M. Chatzakou, “On (λ,μ)-classes on the Engel group,” in Advances in harmonic analysis and partial differential equations, Aveiro, Portugal, 2020, pp. 37–49.
@inproceedings{8713863,
  abstract     = {{The purpose of this note is to compare the properties of the symbolic pseudo-differential calculus on the Heisenberg and on the Engel groups; nilpotent Lie groups of 2-step and 3-step, respectively. Here we provide a preliminary analysis of the structure and of the symbolic calculus with symbols parametrized by (λ, μ) on the Engel group, while for the case of the Heisenberg group we recall the analogous results on the λ-classes of symbols.}},
  author       = {{Chatzakou, Marianna}},
  booktitle    = {{Advances in harmonic analysis and partial differential equations}},
  editor       = {{Georgiev, Vladimir and Ozawa, Tohru and Ruzhansky, Michael and Wirth, Jens}},
  isbn         = {{9783030582173}},
  issn         = {{2297-0215}},
  language     = {{eng}},
  location     = {{Aveiro, Portugal}},
  pages        = {{37--49}},
  publisher    = {{Springer}},
  title        = {{On (λ,μ)-classes on the Engel group}},
  url          = {{http://doi.org/10.1007/978-3-030-58215-9_2}},
  year         = {{2020}},
}

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