St. Petersburg Mathematical Journal, 4. cilt,4-6. sayılarAmerican Mathematical Society, 1993 |
Kitabın içinden
83 sonuçtan 1-3 arası sonuçlar
Sayfa 882
Theorem 1. ( i ) If f satisfies the condition ( 3.3 ) | f ( z ) | ≤ clys , ze L , then for EAs for every n = 1 , 2 , ... ( ii ) Iƒ ƒo " € As for some n > s , then f satisfies ( 3.3 ) . Remark . 1 ) Theorem 1 ( ii ) of §2 shows that the ...
Theorem 1. ( i ) If f satisfies the condition ( 3.3 ) | f ( z ) | ≤ clys , ze L , then for EAs for every n = 1 , 2 , ... ( ii ) Iƒ ƒo " € As for some n > s , then f satisfies ( 3.3 ) . Remark . 1 ) Theorem 1 ( ii ) of §2 shows that the ...
Sayfa 1092
... satisfies ( 2.6 ) with a small Q it can be shown that M [ W1 , W1 ] ≥ ( v / 2 ) √ │VW , | 2 dx , and the function y ( t ) = f yo ( t , x ) | Vw | 2 dx satisfies ( 2.9 ) . By part 2 ) of Lemma 2.1 , w = 0 . To prove part 3 ) of ...
... satisfies ( 2.6 ) with a small Q it can be shown that M [ W1 , W1 ] ≥ ( v / 2 ) √ │VW , | 2 dx , and the function y ( t ) = f yo ( t , x ) | Vw | 2 dx satisfies ( 2.9 ) . By part 2 ) of Lemma 2.1 , w = 0 . To prove part 3 ) of ...
Sayfa 1115
... satisfies the conservation laws Jdxlv2 = const , - > f . dx [ { \\ x2 + Uo ( \ w | 2 ) ] = const , Vo ( v ) = ± √ ° F ( 5 ) d5 . S Furthermore , for all t R , the H1 - norm of y satisfies ( 1.2.4 ) where c : R → || ¥ ( • , t ) || H ...
... satisfies the conservation laws Jdxlv2 = const , - > f . dx [ { \\ x2 + Uo ( \ w | 2 ) ] = const , Vo ( v ) = ± √ ° F ( 5 ) d5 . S Furthermore , for all t R , the H1 - norm of y satisfies ( 1.2.4 ) where c : R → || ¥ ( • , t ) || H ...
İçindekiler
MATHEMATICS | 665 |
150 | 832 |
ABSTRACT Let be an elliptic differential operator of order n2 with constant | 940 |
Telif Hakkı | |
4 diğer bölüm gösterilmiyor
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a₁ analytic assertion assume asymptotic Blaschke product boundary bounded C₁ cone consider const constant construction convex corresponding covector cubes D₁ decomposition defined definition denote diffeomorphisms differential domain eigenvalues English transl equality equation equivalent estimate exists finite follows function f H₁ hence Hilbert space Hölder holds inequality inner function integral irreducible lattice Lemma Leningrad Lie algebra linear M₁ mapping Mathematical Mathematics Subject Classification maximum principle morphism multiplicity nonlinear norm obtained operator pair perturbation polynomial problem proof of Theorem properties Proposition proved representation Riemann-Roch theorem S₁ satisfying the conditions scattering matrix scattering theory selfadjoint singular smooth solution Soviet Math space spectral spectrum Steklov subspace sufficiently Suppose t₁ Theorem 1.1 theory trace formula trace-class unique unitary V₁ zero