Time dependent boundary norms for kernels and regularizing properties of the double layer heat potential

Massimo Lanza de Cristoforis; PAOLO LUZZINI

Time dependent boundary norms for kernels and regularizing properties of the double layer heat potential

Massimo Lanza de Cristoforis
, PAOLO LUZZINI

Department of Science and Technological Innovation

Research output: Contribution to journal › Article › peer-review

Abstract

We introduce a class of norms for time dependent kernels on the boundary of Lipschitz parabolic cylinders and we prove theorems of joint continuity of integral operators upon variation of both the kernel and the density function. As an application, we prove that the integral operator associated to the double layer heat potential has a regularizing property on the boundary.

Original language	English
Pages (from-to)	76-118
Number of pages	43
Journal	EURASIAN MATHEMATICAL JOURNAL
Volume	8
Issue number	1
Publication status	Published - 2017

Keywords

Double layer heat potential
Integral operators on Lipschitz parabolic cylinders
Mathematics (all)

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https://hdl.handle.net/11579/177483

Cite this

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title = "Time dependent boundary norms for kernels and regularizing properties of the double layer heat potential",

abstract = "We introduce a class of norms for time dependent kernels on the boundary of Lipschitz parabolic cylinders and we prove theorems of joint continuity of integral operators upon variation of both the kernel and the density function. As an application, we prove that the integral operator associated to the double layer heat potential has a regularizing property on the boundary.",

keywords = "Double layer heat potential, Integral operators on Lipschitz parabolic cylinders, Mathematics (all), Double layer heat potential, Integral operators on Lipschitz parabolic cylinders, Mathematics (all)",

author = "\{de Cristoforis\}, \{Massimo Lanza\} and PAOLO LUZZINI",

year = "2017",

language = "English",

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pages = "76--118",

journal = "EURASIAN MATHEMATICAL JOURNAL",

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number = "1",

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TY - JOUR

T1 - Time dependent boundary norms for kernels and regularizing properties of the double layer heat potential

AU - de Cristoforis, Massimo Lanza

AU - LUZZINI, PAOLO

PY - 2017

Y1 - 2017

N2 - We introduce a class of norms for time dependent kernels on the boundary of Lipschitz parabolic cylinders and we prove theorems of joint continuity of integral operators upon variation of both the kernel and the density function. As an application, we prove that the integral operator associated to the double layer heat potential has a regularizing property on the boundary.

AB - We introduce a class of norms for time dependent kernels on the boundary of Lipschitz parabolic cylinders and we prove theorems of joint continuity of integral operators upon variation of both the kernel and the density function. As an application, we prove that the integral operator associated to the double layer heat potential has a regularizing property on the boundary.

KW - Double layer heat potential

KW - Integral operators on Lipschitz parabolic cylinders

KW - Mathematics (all)

KW - Double layer heat potential

KW - Integral operators on Lipschitz parabolic cylinders

KW - Mathematics (all)

UR - https://iris.uniupo.it/handle/11579/177483

M3 - Article

SN - 2077-9879

VL - 8

SP - 76

EP - 118

JO - EURASIAN MATHEMATICAL JOURNAL

JF - EURASIAN MATHEMATICAL JOURNAL

IS - 1

ER -

Time dependent boundary norms for kernels and regularizing properties of the double layer heat potential

Abstract

Keywords

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