The Diederich–Fornaess index and the global regularity of the ∂¯-Neumann problem

We describe along the guidelines of Kohn (Quantitative Estimates for Global Regularity. Analysis and Geometry in Several Complex Variables, pp. 97–128. Trend Math. Birkhäuser, Boston, 1999 ), the constant E s which is needed to control the commutator of a totally real vector field T E with ∂ ¯ ∗ in...

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Vydané v:Mathematische Zeitschrift Ročník 276; číslo 1-2; s. 93 - 113
Hlavní autori: Pinton, Stefano, Zampieri, Giuseppe
Médium: Journal Article
Jazyk:English
Vydavateľské údaje: Berlin/Heidelberg Springer Berlin Heidelberg 01.02.2014
Predmet:
Mathematics
Mathematics and Statistics
32F10
32F20
32N15
32T25
ISSN:0025-5874, 1432-1823
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Shrnutí:We describe along the guidelines of Kohn (Quantitative Estimates for Global Regularity. Analysis and Geometry in Several Complex Variables, pp. 97–128. Trend Math. Birkhäuser, Boston, 1999 ), the constant E s which is needed to control the commutator of a totally real vector field T E with ∂ ¯ ∗ in order to have H s a-priori estimates for the Bergman projection B k , k ≥ q - 1 , on a smooth q -convex domain D ⊂ ⊂ C n . This statement, not explicit in Kohn (Quantitative Estimates for Global Regularity. Analysis and Geometry in Several Complex Variables, pp. 97–128. Trend Math. Birkhäuser, Boston, 1999 ), yields regularity of B k in specific Sobolev degree s . Next, we refine the pseudodifferential calculus at the boundary in order to relate, for a defining function r of D , the operators ( T + ) - δ 2 and ( - r ) δ 2 . We are thus able to extend to general degree k ≥ 0 of B k , the conclusion of (Quantitative Estimates for Global Regularity. Analysis and Geometry in Several Complex Variables, pp. 97–128. Trend Math. Birkhäuser, Boston, 1999 ) which only holds for q = 1 and k = 0 : if for the Diederich–Fornaess index δ of D , we have ( 1 - δ ) 1 2 ≤ E s , then B k is H s -regular.
ISSN:0025-5874
1432-1823
DOI:10.1007/s00209-013-1188-z