Optimal Sobolev estimates for ∂̄ on convex domains of finite type

Heungju Ahn; Hong Rae Cho

doi:10.1007/s00209-003-0525-z

Optimal Sobolev estimates for ∂̄ on convex domains of finite type

Heungju Ahn, Hong Rae Cho

School of Undergraduate Studies

Pusan National University

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

4 Scopus citations

Abstract

We prove that solutions for ∂̄ get 1/M-derivatives more than the data in L^p-Sobolev spaces on a bounded convex domain of finite type M by means of the integral kernel method. Also we prove that the Bergman projection is invariant under the L^p-Sobolev spaces of fractional orders by different methods from McNeal-Stein's. By using these results, we can get L^p-Sobolev estimates of order 1/M for the canonical solution for ∂̄.

Original language	English
Pages (from-to)	837-857
Number of pages	21
Journal	Mathematische Zeitschrift
Volume	244
Issue number	4
DOIs	https://doi.org/10.1007/s00209-003-0525-z
State	Published - Aug 2003

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title = "Optimal Sobolev estimates for {\=∂} on convex domains of finite type",

abstract = "We prove that solutions for {\=∂} get 1/M-derivatives more than the data in Lp-Sobolev spaces on a bounded convex domain of finite type M by means of the integral kernel method. Also we prove that the Bergman projection is invariant under the Lp-Sobolev spaces of fractional orders by different methods from McNeal-Stein's. By using these results, we can get Lp-Sobolev estimates of order 1/M for the canonical solution for {\=∂}.",

author = "Heungju Ahn and Cho, \{Hong Rae\}",

year = "2003",

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doi = "10.1007/s00209-003-0525-z",

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journal = "Mathematische Zeitschrift",

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T1 - Optimal Sobolev estimates for ∂̄ on convex domains of finite type

AU - Ahn, Heungju

AU - Cho, Hong Rae

PY - 2003/8

Y1 - 2003/8

N2 - We prove that solutions for ∂̄ get 1/M-derivatives more than the data in Lp-Sobolev spaces on a bounded convex domain of finite type M by means of the integral kernel method. Also we prove that the Bergman projection is invariant under the Lp-Sobolev spaces of fractional orders by different methods from McNeal-Stein's. By using these results, we can get Lp-Sobolev estimates of order 1/M for the canonical solution for ∂̄.

AB - We prove that solutions for ∂̄ get 1/M-derivatives more than the data in Lp-Sobolev spaces on a bounded convex domain of finite type M by means of the integral kernel method. Also we prove that the Bergman projection is invariant under the Lp-Sobolev spaces of fractional orders by different methods from McNeal-Stein's. By using these results, we can get Lp-Sobolev estimates of order 1/M for the canonical solution for ∂̄.

UR - https://www.scopus.com/pages/publications/0041331466

U2 - 10.1007/s00209-003-0525-z

DO - 10.1007/s00209-003-0525-z

M3 - Article

AN - SCOPUS:0041331466

SN - 0025-5874

VL - 244

SP - 837

EP - 857

JO - Mathematische Zeitschrift

JF - Mathematische Zeitschrift

IS - 4

ER -

Optimal Sobolev estimates for ∂̄ on convex domains of finite type

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