St. Petersburg Mathematical Journal, 18. cilt,511-1027. sayfalarAmerican Mathematical Society, 2007 |
Kitabın içinden
34 sonuçtan 1-3 arası sonuçlar
Sayfa 520
... vertices w and z of T2 ( u ) , let △ = [ u ] n [ w ] [ z ] , and let 8 = | A | . Then one of the following statements is true : ( 1 ) the vertices w and z are not adjacent and 8 ≤ 1 ; ( 2 ) △ contains two nonadjacent vertices and 8 ...
... vertices w and z of T2 ( u ) , let △ = [ u ] n [ w ] [ z ] , and let 8 = | A | . Then one of the following statements is true : ( 1 ) the vertices w and z are not adjacent and 8 ≤ 1 ; ( 2 ) △ contains two nonadjacent vertices and 8 ...
Sayfa 528
... vertices d ' , f , and g of [ d ] ~ [ u ] , the vertices ƒ and g are adjacent to w . This contradicts the fact that [ d ] [ w ] contains u , f , g , x , and x ' . Lemma 3.4 . For every geodesic 3 - path uwxy , the subgraph [ y ] г3 ( w ) ...
... vertices d ' , f , and g of [ d ] ~ [ u ] , the vertices ƒ and g are adjacent to w . This contradicts the fact that [ d ] [ w ] contains u , f , g , x , and x ' . Lemma 3.4 . For every geodesic 3 - path uwxy , the subgraph [ y ] г3 ( w ) ...
Sayfa 529
... vertices y and z that do not lie in [ w ] U [ d ] . This contradicts Lemma 1.5 . Thus , [ w ] [ y ] is a clique . If | [ u ] ~ [ a ] N [ b ] | ≥ 2 for distinct vertices a and b of the graph [ w ] [ y ] , then [ a ] [ e ] contains two ...
... vertices y and z that do not lie in [ w ] U [ d ] . This contradicts Lemma 1.5 . Thus , [ w ] [ y ] is a clique . If | [ u ] ~ [ a ] N [ b ] | ≥ 2 for distinct vertices a and b of the graph [ w ] [ y ] , then [ a ] [ e ] contains two ...
İçindekiler
Asekritova and N Kruglyak Interpolation of Besov spaces in the nondiagonal | 511 |
N Belousov and A A Makhnev On edgeregular graphs with k 3b₁ 3 | 517 |
Generalov and N Yu Kosovskaya Hochschild cohomology of the Liu | 539 |
Telif Hakkı | |
36 diğer bölüm gösterilmiyor
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Sık kullanılan terimler ve kelime öbekleri
Abelian group Abelian variety adjacent Alexander polynomial algebra ú assume assumptions of Theorem b₁ BR(TO Branges space BSu2 C₁ Cartier modules cascade algorithm chain complex coefficients cohomology common invariant subspaces commutative constant contains convergence Corollary corrector corresponding defined definition denote elements English transl entire functions epimorphism estimate exists extension finite height Fitting invariants formal group formula graph group G group scheme H¹(M homomorphism ideal implies inequality integral invariant subspaces isomorphic K₁ Lemma Lie bialgebra linear Math Mathematical matrix multiplicity norm obtain operator parameters Proof Proposition proved pseudorational quantization quotient R-module refinable function refinement equation result Riemann-Roch theorem right representation ring satisfies sequence solution Subsection Suppose symbol symmetric zeros T₁ theory Toeplitz operators trivial twisted Alexander polynomial twisted Novikov homology vector vertex vertices