St. Petersburg Mathematical Journal, 19. cilt,1-494. sayfalarAmerican Mathematical Society, 2008 |
Kitabın içinden
86 sonuçtan 1-3 arası sonuçlar
Sayfa 46
... Theorem 1.1 , we obtain the following results . Theorem 1.4 . The capacity dimension of the boundary at infinity of any hyperbolic group G ( taken with any visual metric ) coincides with the topological dimension of G , cdim G dim d∞ G ...
... Theorem 1.1 , we obtain the following results . Theorem 1.4 . The capacity dimension of the boundary at infinity of any hyperbolic group G ( taken with any visual metric ) coincides with the topological dimension of G , cdim G dim d∞ G ...
Sayfa 347
... Theorem 3.5 to G1 = Rm , G2 = R " , N = R " \ Zn . Then , in the case where m = n = 1 , we get the following statement . Theorem 6.10 . Let N = { ( §1 , §2 ) E R2 : 2 Z } . Then LP L1⁄2 ( R2 ) = { ƒ Σf ( x1 , € Ľ3 ( R2 ) : Σ ƒ ( x1 , x2 ...
... Theorem 3.5 to G1 = Rm , G2 = R " , N = R " \ Zn . Then , in the case where m = n = 1 , we get the following statement . Theorem 6.10 . Let N = { ( §1 , §2 ) E R2 : 2 Z } . Then LP L1⁄2 ( R2 ) = { ƒ Σf ( x1 , € Ľ3 ( R2 ) : Σ ƒ ( x1 , x2 ...
Sayfa 351
... Theorem 5.7 . Consequently , L ; ( R2 ) LRx ( a − e / 2 , a + e / 2 ) ( R2 ) for every a Є R , whence [ II ] p = R2 . = Corollary 7.15 . Let f be the same as in Theorem 7.14 . Then there exists a continu- ous function g : R ( 0 , + ) ...
... Theorem 5.7 . Consequently , L ; ( R2 ) LRx ( a − e / 2 , a + e / 2 ) ( R2 ) for every a Є R , whence [ II ] p = R2 . = Corollary 7.15 . Let f be the same as in Theorem 7.14 . Then there exists a continu- ous function g : R ( 0 , + ) ...
İçindekiler
S Alesker Quaternionic plurisubharmonic functions and their applications | 1 |
S ArtsteinAvidan and V D Milman Using Rademacher permutations | 15 |
Burago S Ivanov and D Shoenthal Two counterexamples in low | 33 |
Telif Hakkı | |
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A₁ Algebra asdim assume asymptotic dimension Aut F automorphisms b₁ ball boundary at infinity bounded c₁ cdim Chevalley groups Co(Z commutative ring compact consider constant construct convex body convex sets Corollary cup product defined definition denote diam EEO(n elementary elements English transl EO(n equations estimate Euclidean exists finite Finsler metric function f geodesic geometric GL(n GO(n group G Hence homeomorphism hypdim hyper-Hermitian hyperbolic groups hyperbolic space implies inequality integer invariant isometric isomorphism K₁ Lemma log-concave log-concave function Math matrix matrix-valued function measure metric space nontrivial nonzero obtain open covering orthogonal group overgroups paper Petersburg plurisubharmonic functions polygonal line problem proof of Theorem Proposition prove quasi-isometric quaternionic random satisfies self-similar sequence solution subgroup subset subspace symmetric tensor valuations Theorem 1.1 topological transvection tubular neighborhood uniformly vector