St. Petersburg Mathematical Journal, 15. cilt,1-468. sayfalarAmerican Mathematical Society, 2004 |
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18 sonuçtan 1-3 arası sonuçlar
Sayfa 294
... ( Nint , R ) = E2 ( int ) & R , and E2 ( Next , R ) = E2 ( Next ) & R. The & elements of the second and the third spaces are R - valued functions analytic in Nint ( Next ) and having nontangential boundary values a.e. [ 20 ] . The norm in ...
... ( Nint , R ) = E2 ( int ) & R , and E2 ( Next , R ) = E2 ( Next ) & R. The & elements of the second and the third spaces are R - valued functions analytic in Nint ( Next ) and having nontangential boundary values a.e. [ 20 ] . The norm in ...
Sayfa 294
... ( Nint , R ) = E2 ( Nint ) & R , and E2 ( Next , R ) = E2 ( Next ) & R. The & elements of the second and the third spaces are R - valued functions analytic in Nint ( Next ) and having nontangential boundary values a.e. [ 20 ] . The norm ...
... ( Nint , R ) = E2 ( Nint ) & R , and E2 ( Next , R ) = E2 ( Next ) & R. The & elements of the second and the third spaces are R - valued functions analytic in Nint ( Next ) and having nontangential boundary values a.e. [ 20 ] . The norm ...
Sayfa 301
... ( Nint , R. ) → SÊ2 ( Nint , R ) ( here P is the orthogonal projection onto K ) . This isomorphism trans- forms the quotient operator M2,6 into the restricted shift operator → PK ( 24 ) in the space K ( for an unbounded domain nint , it ...
... ( Nint , R. ) → SÊ2 ( Nint , R ) ( here P is the orthogonal projection onto K ) . This isomorphism trans- forms the quotient operator M2,6 into the restricted shift operator → PK ( 24 ) in the space K ( for an unbounded domain nint , it ...
İçindekiler
2004 No 1 Pages 140 | 2 |
New modifications of the analytic capacity | 24 |
Mathematics Subject Classification Primary 31A15 | 139 |
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American Mathematical Society analytic capacity analytic function arbitrary assume asymptotics BLSu Bmax Bmin boundary Cantor function Cauchy cell decomposition characteristic function closed braid condition consider continuous Corollary corresponding defined definition denote domain ʲ(Nint English transl equation equivalent exists finite formula geodesics Herglotz Hilbert space Hölder inequality identity implies inequality infimum integral interval Lebesgue Lebesgue measure Lemma linear function mapping Math matrix Moreover multigerm Nint nonzero obtain operator measure orthogonal p₁ Petersburg polynomial problem proof of Theorem Proposition proved q₁ relation representation respect satisfying selfadjoint selfadjoint operator sequence singular spectral spectrum subgroup subset subspace Suppose symplectic symplectomorphism tangent space Theorem theory uniqueness vector wavelet zero