St. Petersburg Mathematical Journal, 13. cilt,509-1080. sayfalarAmerican Mathematical Society, 2002 |
Kitabın içinden
43 sonuçtan 1-3 arası sonuçlar
Sayfa 951
... analytic function . We apply Lemma 3.3 with § = P1 and a = a1 . We obtain Þ1 ( z ) = Ũ1 ( z ) V1 ( z ) , ≈ € Da1 , where Ũ1 is analytic and invertible on C \ { a1 } , and V1 is analytic and invertible on Da , U { α1 } . Hence , Ũ1 ( z ) ...
... analytic function . We apply Lemma 3.3 with § = P1 and a = a1 . We obtain Þ1 ( z ) = Ũ1 ( z ) V1 ( z ) , ≈ € Da1 , where Ũ1 is analytic and invertible on C \ { a1 } , and V1 is analytic and invertible on Da , U { α1 } . Hence , Ũ1 ( z ) ...
Sayfa 954
... analytic matrix - valued function on Da , a € C , and assume that A ( z ) has only a simple pole at z = a whose residue is a nonresonant matrix E , A ( z ) = E z -a + " a term analytic at za " , zЄ Da Then the solutions Y : Da → GCnxn ...
... analytic matrix - valued function on Da , a € C , and assume that A ( z ) has only a simple pole at z = a whose residue is a nonresonant matrix E , A ( z ) = E z -a + " a term analytic at za " , zЄ Da Then the solutions Y : Da → GCnxn ...
Sayfa 973
... analytic on C \ { a1 , ... , am } . We are going to analyze the behavior at the singularities z = ak . ( j ) Assume without loss of generality that E are chosen in such a way that M exp ( -2πi ) ) . Then formulas ( 6.25 ) are true ...
... analytic on C \ { a1 , ... , am } . We are going to analyze the behavior at the singularities z = ak . ( j ) Assume without loss of generality that E are chosen in such a way that M exp ( -2πi ) ) . Then formulas ( 6.25 ) are true ...
İçindekiler
Krylov On the CalderónZygmund theorem with applications | 509 |
Z Arov Scattering matrix and impedance of a canonical differential | 527 |
Generalov Cohomology of algebras of semidihedral type I | 549 |
Telif Hakkı | |
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a₁ Abel equation absolutely continuous algebra analytic assume asymptotic bicomplex boundary boundary-value problem bounded bounded operator coefficients components convex Corollary corresponding decomposition defined denote differential direct sum direct summand disk domain edges elements endomorphism ring English transl equivalent estimate exists finite formula graph homomorphism implies indecomposable inequality integral invariant isomorphic Lemma linear M₁ manifold mapping Math Mathematics Subject Classification matrix matrix-valued function module monodromy monoid n₁ nodes nonzero norm notation obtain orthogonal Petersburg polynomials p(z pp-type projective module proof of Theorem Proposition prove relation representation result ring selfadjoint sequence singular smooth solution space Subsection subspace Suppose symmetric T₁ Theorem 1.1 theory trace class unitary operator V₁ values vector zero