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Henkin-Ramirez formulas with weight factors

B. Berndtsson, Mats Andersson (1982)

Annales de l'institut Fourier

We construct a generalization of the Henkin-Ramírez (or Cauchy-Leray) kernels for the $\overline{\partial}$ -equation. The generalization consists in multiplication by a weight factor and addition of suitable lower order terms, and is found via a representation as an “oscillating integral”. As special cases we consider weights which behave like a power of the distance to the boundary, like exp- $ϕ$ with $ϕ$ convex, and weights of polynomial decrease in $C^{n}$ . We also briefly consider kernels with singularities on subvarieties...

Hölder and LP Estimates for ...b on Weakly Pseudo-Convex Boundaries in C2.

Mei-Chi Shaw (1987/1988)

Mathematische Annalen

Hölder and Lp estimates for the solutions of the ∂-equation in non-smooth strictly pseudoconvex domains.

Josep M. Burgués Badía (1990)

Publicacions Matemàtiques

Let D be a bounded strict pseudoconvex non-smooth domain in Cn. In this paper we prove that the estimates in Lp and Lipschitz classes for the solutions of the ∂-equation with Lp-data in regular strictly pseudoconvex domains (see [2]) are also valid for D. We also give estimates of the same type for the ∂b in the regular part of the boundary of these domains.

Displaying 1 – 8 of 8

Henkin-Ramirez formulas with weight factors

Hölder and LP Estimates for ...b on Weakly Pseudo-Convex Boundaries in C2.

Hölder and Lp estimates for the solutions of the ∂-equation in non-smooth strictly pseudoconvex domains.

Hölder and LP-Estimates for the ...-Equation in Some Convex Domains with Real-Analytic Boundary.

Hölder and Lp-Estimates for the ...-Equation on Non-Smooth strictly q-convex domains.

Hölder Type Estimates for the $\bar{\partial}$ -equation in Strongly Pseudoconvex Domains

Holomorphic Lipschitz functions and application to the $v \partial$ -problem

Hypoellipticité pour l'opérateur ... .

Currently displaying 1 – 8 of 8