St. Petersburg Mathematical Journal, 4. cilt,4-6. sayılarAmerican Mathematical Society, 1993 |
Kitabın içinden
44 sonuçtan 1-3 arası sonuçlar
Sayfa 783
... subspaces H ( ) Hom , ( E , H ) CV ) . It turns out that in some cases it is convenient to describe the Harish - Chandra submodules H of V by specifying the corresponding subspaces H ( ^ ) ≤ V ( ^ ) . = The basic examples of Harish ...
... subspaces H ( ) Hom , ( E , H ) CV ) . It turns out that in some cases it is convenient to describe the Harish - Chandra submodules H of V by specifying the corresponding subspaces H ( ^ ) ≤ V ( ^ ) . = The basic examples of Harish ...
Sayfa 1247
... subspace D are not mutually orthogonal . They can be replaced by the smaller subspaces D + = D2n ( D2 ) + = 01н2 02н2 = 0,02H2 , + D_ = Do ~ ( D2 ) 1 = 02H2 ~ 01н2 = ( 02H2 + 01H2 ) ± = ( H2 ) ± = H2 that now satisfy the condition of ...
... subspace D are not mutually orthogonal . They can be replaced by the smaller subspaces D + = D2n ( D2 ) + = 01н2 02н2 = 0,02H2 , + D_ = Do ~ ( D2 ) 1 = 02H2 ~ 01н2 = ( 02H2 + 01H2 ) ± = ( H2 ) ± = H2 that now satisfy the condition of ...
Sayfa 1252
... subspaces of the discrete spectrum of the operators T + and T , respectively , T = PKU | K , T + = PKU * | K . In the incoming spectral representation the subspaces N and N , have the form nt = H2 = 0н2 , N。= 02 ( H2 – 0H2 ) . Ө 0H2 ...
... subspaces of the discrete spectrum of the operators T + and T , respectively , T = PKU | K , T + = PKU * | K . In the incoming spectral representation the subspaces N and N , have the form nt = H2 = 0н2 , N。= 02 ( H2 – 0H2 ) . Ө 0H2 ...
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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Sık kullanılan terimler ve kelime öbekleri
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