St. Petersburg Mathematical Journal, 17. cilt,1-551. sayfalarAmerican Mathematical Society, 2006 |
Kitabın içinden
39 sonuçtan 1-3 arası sonuçlar
Sayfa 391
Proof . The proof of Theorem 3.1 shows that it suffices to check that for any non - N- periodic simple A - module S the space Exts + 1 ( S , T ) TES → T induces a nonzero map at exactly one is contained in the subalgebra generated by ...
Proof . The proof of Theorem 3.1 shows that it suffices to check that for any non - N- periodic simple A - module S the space Exts + 1 ( S , T ) TES → T induces a nonzero map at exactly one is contained in the subalgebra generated by ...
Sayfa 417
Theorem 2.1 is a consequence of Lemmas 2.3 , 2.4 , and 2.5 . For the proof ... 3.1 . Suppose { F , G , H } € г ( p , q , F ) and g € G. For any two ... ( 3.1 ) ̧μôзo ̧ ̄¡μ3Â ( μ ( k + i × ) ) ̧1μo ̧μôз ¥ = Ô ( 0 ) + μ ( C1ô1 + C2ô2 ) . e ...
Theorem 2.1 is a consequence of Lemmas 2.3 , 2.4 , and 2.5 . For the proof ... 3.1 . Suppose { F , G , H } € г ( p , q , F ) and g € G. For any two ... ( 3.1 ) ̧μôзo ̧ ̄¡μ3Â ( μ ( k + i × ) ) ̧1μo ̧μôз ¥ = Ô ( 0 ) + μ ( C1ô1 + C2ô2 ) . e ...
Sayfa 419
... Theorem 3.1 . If under the assumptions of Theorem 3.1 we put C1 = iH , C2 = 0 , then C1 , C2 € L ( K ) °C L2 { g , Z2 } for any g € G. Therefore , the next theorem , which we need for what follows , is a consequence of Theorem 3.1 . Theorem ...
... Theorem 3.1 . If under the assumptions of Theorem 3.1 we put C1 = iH , C2 = 0 , then C1 , C2 € L ( K ) °C L2 { g , Z2 } for any g € G. Therefore , the next theorem , which we need for what follows , is a consequence of Theorem 3.1 . Theorem ...
İçindekiler
Антипов М А Генералов А И Конечная порожденность алгебр | 1 |
A Antipov and A I Generalov The Yoneda algebras of symmetric special | 377 |
of index issues of Mathematical Reviews | 379 |
Telif Hakkı | |
8 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
a₁ absolutely continuous algebraic solutions amoebas analytic arbitrary assume asymptotic Bäcklund transformations Belyĭ function Bose gas bounded c₁ coefficients condition conjugacy classes consider constant convex Corollary correlation functions corresponding curves defined deformation denote dessins Dirac operator discrete edges eigenvalues element English transl estimate exists finite formula G-cycle Goursat problem graph hyperbolic identity implies inequality integral K-functional K-surfaces k₁ lattice Lemma linear Lipschitz Math Mathematics Subject Classification matrix functions mesh(U metric metric space Newton polygon notation obtain Painlevé equation parameter Phys polygon polynomial proof of Theorem Proposition prove quantum R-matrix relation result RS-transformations satisfies Schrödinger operator selfadjoint sequence sixth Painlevé equation space spectrum Subsection subspace symmetric Theorem 2.1 theory transformation vector vertex vertices X₁ YB equation zero