St. Petersburg Mathematical Journal, 14. cilt,1-534. sayfalarAmerican Mathematical Society, 2003 |
Kitabın içinden
35 sonuçtan 1-3 arası sonuçlar
Sayfa 252
... weight on Z + , i.e. , a map σ : Z + ( 0 , + ∞ ) for which the usual shift S : ( un ) n > 0 → ( un - 1 ) n > 0 ( with the convention that u_1 = 0 ) and the backward shift T : ( Un ) n≥0 ↔ ( Un + 1 ) n≥0 are bounded on the weighted ...
... weight on Z + , i.e. , a map σ : Z + ( 0 , + ∞ ) for which the usual shift S : ( un ) n > 0 → ( un - 1 ) n > 0 ( with the convention that u_1 = 0 ) and the backward shift T : ( Un ) n≥0 ↔ ( Un + 1 ) n≥0 are bounded on the weighted ...
Sayfa 266
... weight on Z + . If o ( n ) 1 = 0 and lim = 0 , n¬ + ∞ σ ( n ) p ( T ) n lim n― + ∞ p ( S ) n then Ĥ ( ) satisfies condition ( 4.1 ) . - = = Tumalo . 0 , = Proof . For E , we put C1 = ( A ) nez . If the series Eno - 2。2 ( n ) is di ...
... weight on Z + . If o ( n ) 1 = 0 and lim = 0 , n¬ + ∞ σ ( n ) p ( T ) n lim n― + ∞ p ( S ) n then Ĥ ( ) satisfies condition ( 4.1 ) . - = = Tumalo . 0 , = Proof . For E , we put C1 = ( A ) nez . If the series Eno - 2。2 ( n ) is di ...
Sayfa 283
... weight a if there exist constants C > 0 , 0 < ɛ ≤ 1 , and y > 1 such that ( 4 ) ( 5 ) ( 6 ) ( 7 ) Σløjl≤ca.e .; jEZ | xj | a ≤ Cy3 , je Z ; Σlly ≤ Ca ; j € Z Σφ ; = 1 . jez We shall also use the expression " a weight a admits an ...
... weight a if there exist constants C > 0 , 0 < ɛ ≤ 1 , and y > 1 such that ( 4 ) ( 5 ) ( 6 ) ( 7 ) Σløjl≤ca.e .; jEZ | xj | a ≤ Cy3 , je Z ; Σlly ≤ Ca ; j € Z Σφ ; = 1 . jez We shall also use the expression " a weight a admits an ...
İçindekiler
Китаев А В Специальные функции изомонодромного типа ра | 121 |
Набоко С Н Янас Я Критерии полуограниченности в одном | 158 |
Пажитнов А В О замкнутых орбитах градиентных потоков ото | 186 |
Telif Hakkı | |
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algebraic analytic apply assume basis boundary bounded called chain homotopy closed coefficients complex condition connection Consequently consider constant construction contains continuous convex corresponding defined definition deformation denote determined domain element equal equation equivalence estimate exists extension fact field finite fixed formula function given identity implies inequality integral intersection introduce inverse isomorphism Lemma linear Math Mathematical matrix measure metric Moreover natural normal Observe obtain Obviously operator orientation particular periodic positive present problem projective Proof properties Proposition prove regular relation Remark respectively result ring satisfies scheme sequence singular smooth solutions space statement Subsection suffices Suppose takes Theorem theory transformation true twists vector weight zero