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25 sonuçtan 1-3 arası sonuçlar
Sayfa 819
The Chern structure on a homology theory Ax is said to be commutative if , for
any smooth variety X , any closed subset 2 C X , and any line bundles L1 / X and
L2 / X , the Chern homomorphisms e ? ( Li ) and e ? ( L2 ) commute with each
other ...
The Chern structure on a homology theory Ax is said to be commutative if , for
any smooth variety X , any closed subset 2 C X , and any line bundles L1 / X and
L2 / X , the Chern homomorphisms e ? ( Li ) and e ? ( L2 ) commute with each
other ...
Sayfa 820
A vector bundle isomorphism 4 : E → E ' induces an isomorphism 0 : P ( E ) + P (
E ' ) of projective bundles and a line bundle isomorphism 0 * ( OE ' ( - 1 ) ) → OE (
- 1 ) over P ( E ) . Therefore , 0 . 0 $ = ' 00 + P = PHO . . By formula ( 12 ) , we ...
A vector bundle isomorphism 4 : E → E ' induces an isomorphism 0 : P ( E ) + P (
E ' ) of projective bundles and a line bundle isomorphism 0 * ( OE ' ( - 1 ) ) → OE (
- 1 ) over P ( E ) . Therefore , 0 . 0 $ = ' 00 + P = PHO . . By formula ( 12 ) , we ...
Sayfa 822
An orientation on the theory A . is a rule that , to each smooth variety X , each
closed subset Z in X , and each vector bundle E / X , assigns an isomorphism th2
( E ) : A ? ( E ) → A ? ( X ) with the following properties : 1 ) Invariance : For each ...
An orientation on the theory A . is a rule that , to each smooth variety X , each
closed subset Z in X , and each vector bundle E / X , assigns an isomorphism th2
( E ) : A ? ( E ) → A ? ( X ) with the following properties : 1 ) Invariance : For each ...
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İçindekiler
A Brudnyi and D Kinzebulatov Uniform subalgebras of 1 on the unit | 495 |
N A Vavilov Can one see the signs of structure constants? | 519 |
Waldemar Hołubowski A new measure of growth for groups and algebras | 545 |
Telif Hakkı | |
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Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
algebra arrangements assume base belong bundle called character Chevalley closed coefficients commutative complete condition consider constant construction contains continuous Corollary corresponding curve defined definition denote determined diagram direct elementary elements embedding equal equation equivalent example exists extension fact field FIGURE finite fixed formula function given Hence homogeneous homomorphism ideal identity implies inequality integer introduce inverse irreducible isomorphism Lemma linear Math Mathematical matrix maximal means module Moreover multiplication natural nonzero normal Note objects obtain operator particular permutation points polynomial positive present prime problem projective Proof properties Proposition prove Providence Recall relations Remark representation respectively result ring root satisfies scheme sequence similar solution space statement structure subgroup subset Suppose Theorem theory values variety vector weight