Capacities associated with scalar signed riesz kernels, and analytic capacity

Joan Mateu; Laura Prat; Joan Verdera

doi:10.1512/iumj.2011.60.437

Capacities associated with scalar signed riesz kernels, and analytic capacity

Joan Mateu, Laura Prat, Joan Verdera

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Resum

Analytic capacity is associated with the Cauchy kernel 1/z and the space L∞. One has likewise capacities associated with the real and imaginary parts of the Cauchy kernel and L∞. Striking results of Tolsa and a simple remark show that these three capacities are comparable. We present an extension of this fact to Rn, n ≥ 3, involving the vector-valued Riesz kernel of homogeneity -1 and n - 1 of its components.

Idioma original	Anglès
Pàgines (de-a)	1319-1361
Revista	Indiana University Mathematics Journal
Volum	60
Número	4
DOIs	https://doi.org/10.1512/iumj.2011.60.437
Estat de la publicació	Publicada - 1 de des. 2011

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10.1512/iumj.2011.60.437

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title = "Capacities associated with scalar signed riesz kernels, and analytic capacity",

abstract = "Analytic capacity is associated with the Cauchy kernel 1/z and the space L∞. One has likewise capacities associated with the real and imaginary parts of the Cauchy kernel and L∞. Striking results of Tolsa and a simple remark show that these three capacities are comparable. We present an extension of this fact to Rn, n ≥ 3, involving the vector-valued Riesz kernel of homogeneity -1 and n - 1 of its components.",

keywords = "Analytic capacity, Linear growth. 2010 MATHEMATICS SUBJECT CLASSIFICATION: 42B20, Scalar signed Riesz kernels",

author = "Joan Mateu and Laura Prat and Joan Verdera",

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T1 - Capacities associated with scalar signed riesz kernels, and analytic capacity

AU - Mateu, Joan

AU - Prat, Laura

AU - Verdera, Joan

PY - 2011/12/1

Y1 - 2011/12/1

N2 - Analytic capacity is associated with the Cauchy kernel 1/z and the space L∞. One has likewise capacities associated with the real and imaginary parts of the Cauchy kernel and L∞. Striking results of Tolsa and a simple remark show that these three capacities are comparable. We present an extension of this fact to Rn, n ≥ 3, involving the vector-valued Riesz kernel of homogeneity -1 and n - 1 of its components.

AB - Analytic capacity is associated with the Cauchy kernel 1/z and the space L∞. One has likewise capacities associated with the real and imaginary parts of the Cauchy kernel and L∞. Striking results of Tolsa and a simple remark show that these three capacities are comparable. We present an extension of this fact to Rn, n ≥ 3, involving the vector-valued Riesz kernel of homogeneity -1 and n - 1 of its components.

KW - Analytic capacity

KW - Linear growth. 2010 MATHEMATICS SUBJECT CLASSIFICATION: 42B20

KW - Scalar signed Riesz kernels

UR - https://www.scopus.com/pages/publications/84867731615

U2 - 10.1512/iumj.2011.60.437

DO - 10.1512/iumj.2011.60.437

M3 - Article

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EP - 1361

JO - Indiana University Mathematics Journal

JF - Indiana University Mathematics Journal

IS - 4

ER -

Capacities associated with scalar signed riesz kernels, and analytic capacity

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