St. Petersburg Mathematical Journal, 18. cilt,511-1027. sayfalarAmerican Mathematical Society, 2007 |
Kitabın içinden
55 sonuçtan 1-3 arası sonuçlar
Sayfa 799
... field ( 4 ) Here r- = ( r12 @STS = r2 , l + r " " pril -plit + 222l - N " , " + N " , l - Nlır = rad , ad + ( Nr ... field on End ( V ) by formula ( 4 ) , where the superscripts 1 , r mark the left- and right - invariant vector fields on ...
... field ( 4 ) Here r- = ( r12 @STS = r2 , l + r " " pril -plit + 222l - N " , " + N " , l - Nlır = rad , ad + ( Nr ... field on End ( V ) by formula ( 4 ) , where the superscripts 1 , r mark the left- and right - invariant vector fields on ...
Sayfa 799
... field ( 4 ) Here r- = 1/2 ( r12 wsTs = r2 + r " - pril - plit +524 , ' — N " , " + N " , 2 — Nlır Ω !! _ _ STS ... field on End ( V ) by formula ( 4 ) , where the superscripts 1 , r mark the left- and right - invariant vector fields on ...
... field ( 4 ) Here r- = 1/2 ( r12 wsTs = r2 + r " - pril - plit +524 , ' — N " , " + N " , 2 — Nlır Ω !! _ _ STS ... field on End ( V ) by formula ( 4 ) , where the superscripts 1 , r mark the left- and right - invariant vector fields on ...
Sayfa 824
... field of A will be called the W - invariant of the matrix B. If ls 1 , we set W ( B , a , X ) = 0 by definition . - 4.2 . Twisted Alexander polynomials : definition . Now we apply the construction of the previous subsection to define ...
... field of A will be called the W - invariant of the matrix B. If ls 1 , we set W ( B , a , X ) = 0 by definition . - 4.2 . Twisted Alexander polynomials : definition . Now we apply the construction of the previous subsection to define ...
İçindekiler
Asekritova and N Kruglyak Interpolation of Besov spaces in the nondiagonal | 511 |
N Belousov and A A Makhnev On edgeregular graphs with k 3b13 | 517 |
Generalov and N Yu Kosovskaya Hochschild cohomology of the Liu | 539 |
Telif Hakkı | |
27 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
adjacent algebra algorithm apply approximation assume assumptions of Theorem b₁ bounded called closed coefficients commutative complex consider constant constructed contains continuous convergence Corollary corresponding cycle defined definition denote depends domain elements entire equal equation equivalent estimate example exists extension fact factorization field finite formal formula function given graph Hence ideal implies inequality integral invariant isomorphic lattice Lemma Math Mathematical matrix means module multiplicity norm Note obtain operator parameters polynomial positive present problem Proof properties Proposition proved reduces refinable regularity relations Remark representation respectively result ring root satisfies scheme sequence solution space statement Subsection subspace suffices Suppose symbol symmetric Theorem theory twisted vector vertex vertices zero