St. Petersburg Mathematical Journal, 10. cilt,579-1070. sayfalarAmerican Mathematical Society, 1999 |
Kitabın içinden
57 sonuçtan 1-3 arası sonuçlar
Sayfa 654
... belongs to the normalizer Nʊ ( σ , I ) of the form net subgroup U ( 0 , г ) in the group U. 2. Form net subgroups for division rings . We begin with a remark about zero form parameters of a D - net . If 0 is a form net parameter for at ...
... belongs to the normalizer Nʊ ( σ , I ) of the form net subgroup U ( 0 , г ) in the group U. 2. Form net subgroups for division rings . We begin with a remark about zero form parameters of a D - net . If 0 is a form net parameter for at ...
Sayfa 798
... belongs to A ( + ^ { x < 1/2 } ) and satisfies the required estimate . We write მ Igl o ( q ) log Əng dsq , zЄr + , as a sum of three integrals along the arcs F ( x ) , гc ( x ) , and г ( x ) , denoting these integrals by J , Je , and ...
... belongs to A ( + ^ { x < 1/2 } ) and satisfies the required estimate . We write მ Igl o ( q ) log Əng dsq , zЄr + , as a sum of three integrals along the arcs F ( x ) , гc ( x ) , and г ( x ) , denoting these integrals by J , Je , and ...
Sayfa 816
... belong to Ɛg ( 1 , + ∞ ) , where c1 ( ) is a continuous linear functional on A ( T ) . Then ( 91 ) o ( ± x1 / 2 ) c1 ... belongs to E3 ( OG ) , we see that the functions d dv ( Q ( int ) ) ..e ( ± v - 1 / 2 ) d ( Q ( int ) ) ( d + ( v ) ...
... belong to Ɛg ( 1 , + ∞ ) , where c1 ( ) is a continuous linear functional on A ( T ) . Then ( 91 ) o ( ± x1 / 2 ) c1 ... belongs to E3 ( OG ) , we see that the functions d dv ( Q ( int ) ) ..e ( ± v - 1 / 2 ) d ( Q ( int ) ) ( d + ( v ) ...
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American Mathematical Society analytic assume assumptions B₁ Banach algebra Beurling-Sobolev algebra boundary c₁ compact conformal mapping construct continuous convergence Corollary corresponding defined definition denote domain embedding English transl equation equivalent esk₁ estimate exists finite formula Fourier geodesic Hence Hilbert space homeomorphic homotopy implies inequality integral interpolation interval intrinsic metric inverse IP(Z kernel Lemma linear manifold mapping class groups Math Mathematics Subject Classification metric metric spaces mult N₁ nonselfadjoint norm obtain operator-valued function Petersburg polyhedron polynomial problem Proposition proved pure point r.i. space rank one perturbations relation respect scalar selfadjoint selfadjoint operator sequence singular spectrum solution spectral function spline subgroup Subsection subspace sufficiently symmetric operator theory unitary unitary operator upper bounded curvature vector field whence zero