St. Petersburg Mathematical Journal, 11. cilt,1-542. sayfalarAmerican Mathematical Society, 2000 |
Kitabın içinden
84 sonuçtan 1-3 arası sonuçlar
Sayfa 174
... Consider the commutative diagram - -1 ) / 2 Tp ( S2k - 1 ) ℗ " ( r − 1 ) / 2 πp ( S2k - 1 ) π ' ( p , r , \ ( u ) ) ( Hoh ) . r - 1 Tp ( S2k ) 1 π ' ( p , r , λ ( u ) ) Tp ( S2k ) where ' and ' are the homomorphisms defined in ...
... Consider the commutative diagram - -1 ) / 2 Tp ( S2k - 1 ) ℗ " ( r − 1 ) / 2 πp ( S2k - 1 ) π ' ( p , r , \ ( u ) ) ( Hoh ) . r - 1 Tp ( S2k ) 1 π ' ( p , r , λ ( u ) ) Tp ( S2k ) where ' and ' are the homomorphisms defined in ...
Sayfa 213
... consider the direct integral ( 2.6 ) H : = √ @ L2 ( N ) dk = c ( t ) fuzz & dx ' , | K ' | < L B : = L2 ( N ) dk . | k | < L Similarly , along with the direct integral H ( see ( 1.26 ) ) , we consider the direct integral ( 2.7 ) Ĥ ...
... consider the direct integral ( 2.6 ) H : = √ @ L2 ( N ) dk = c ( t ) fuzz & dx ' , | K ' | < L B : = L2 ( N ) dk . | k | < L Similarly , along with the direct integral H ( see ( 1.26 ) ) , we consider the direct integral ( 2.7 ) Ĥ ...
Sayfa 426
... consider a distinguished triangle V m , ZU → . Since tf € S , we have UE C , whence mЄ S. Since hm 0 , we have m = gm ' for some morphism m ' . Now , we consider the morphism of distinguished triangles = Y [ -1 ] g " h " fs M S Y -g ...
... consider a distinguished triangle V m , ZU → . Since tf € S , we have UE C , whence mЄ S. Since hm 0 , we have m = gm ' for some morphism m ' . Now , we consider the morphism of distinguished triangles = Y [ -1 ] g " h " fs M S Y -g ...
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A(Sp A₁ absolutely continuous American Mathematical Society assume assumptions asymptotics b₁ Bernstein algebra bigon boundary bounded c₁ coefficients condition configurations consider constant Corollary corresponding defined definition denote distinguished triangle domain dx dt dz² embedding English transl equation equivalent estimate exists extremal decomposition finite formula function functor G₁ geometrization H¹(k homomorphism homotopy classes idempotents implies inequality integral isomorphism journals K₁ kernel Lemma linear mapping Math MathSciNet matrix metric morphism norm notation obtain operator orthogonal P-category parameters polynomials problem proof of Theorem Proposition proved quadratic differential quadratic forms reduced module relation Riemann surface satisfying selfadjoint semigroup sequence solution space Steklov subalgebra Subsection sufficiently Suppose symmetric Theorem 2.1 theory trajectories u₁ unique variables vector vertex whence