Differentiability Properties of the Symbol of a Generalized Riesz Potential with Homogeneous Characteristic

Let f be a positive homogeneous function of degree 0 defined on the sphere Σ of the space ℝn, and let Φα be the symbol of the integral operator∫ℝnf((x−y)/|x−y|)|x−y|n−αu(y)dy,u∈C0∞(ℝn), with 0 < α < n. We study differentiability properties of the restriction of Φα to the unit sphere Σ in the spaces Hpl(Σ) for p ∈ (1,∞), where Hpl(Σ) denotes the space of Bessel potentials with the norm ‖f‖Hpl(Σ)=‖(δ+I)l/2f‖Lp(Σ) and δ is the Beltrami operator on the sphere. We prove that if f ∈ Lp(Σ), then Φα|Σ∈Hpl(Σ) for any l ≤ n/2 − α − |p−1 − 2−1|(n − 2). Conversely, if Φα|Σ∈Hpl(Σ) with |l ≥ n/2 − α+|p−1 − 2−1|(n − 2), then f ∈ Lp(Σ). The results are sharp. © 2019, Springer Science+Business Media, LLC, part of Springer Nature.

Авторы
Lanzara F.1 , Maz’ya V. 2, 3
Издательство
Springer New York LLC
Номер выпуска
2
Язык
Английский
Страницы
200-213
Статус
Опубликовано
Том
242
Год
2019
Организации
  • 1 Sapienza University of Rome, 2, Piazzale Aldo Moro, Rome, 00185, Italy
  • 2 University of Linköping, Linköping, 581 83, Sweden
  • 3 Sweden RUDN University, 6 Miklukho-Maklay St, Moscow, 117198, Russian Federation
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