標(biāo)題: Titlebook: Geometric Aspects of Functional Analysis; Israel Seminar (GAFA J. Lindenstrauss,V. Milman Conference proceedings 1995 Birkh?user Verlag 199 [打印本頁] 作者: counterfeit 時間: 2025-3-21 17:44
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書目名稱Geometric Aspects of Functional Analysis被引頻次
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書目名稱Geometric Aspects of Functional Analysis讀者反饋
書目名稱Geometric Aspects of Functional Analysis讀者反饋學(xué)科排名
作者: 最有利 時間: 2025-3-21 22:49
A Hereditarily Indecomposable Space with an Asymptotic Unconditional Basis, the symbol ‘<’ in this context, which is becoming standard, see the next section.) Loosely, such a space looks like .. if one goes far enough along the basis. The argument is completed with the proof that if 1 < . < ∞ then an asymptotically .. space with an unconditional basis is arbitrarily distortable.作者: 矛盾 時間: 2025-3-22 00:59 作者: 單獨(dú) 時間: 2025-3-22 04:38
Products of Unconditional Bodies, ≤ . ≤ ∞, and . and . are unconditional bodies that are maximal subject to . · . ? ., then . ·. = .; in other words, for any . we have . · ... = .. This generalises Lozanovskii’s theorem. We also construct an example to show that equality need not hold for a general unconditional body M: . · ... = . does not hold in general.作者: 濃縮 時間: 2025-3-22 12:08
Estimates for Cone Multipliers, ball. Our argument shows also that if μ is a measure supported by . and . = 0 on a neighborhood of the cone Γ, then if . surface measure of T, one may bound ||(μ * μ) ρ||. for certain . < 2. This fact and especially an understanding for what surfaces this phenomenon holds, seems of independent interest.作者: Ordeal 時間: 2025-3-22 14:06
0255-0156 shed privately by Tel Aviv University 1985-86 Springer Lecture Notes, Vol. 1267 1986-87 Springer Lecture Notes, Vol. 1317 1987-88 Springer Lecture Notes, Vol. 1376 1989-90 Springer Lecture Notes, Vol. 1469 As in the previous vC!lumes the central subject of -this volume is Banach space theory in its 作者: Ordeal 時間: 2025-3-22 20:40
,Pathophysiologie — Pathomorphologie, ≤ . ≤ ∞, and . and . are unconditional bodies that are maximal subject to . · . ? ., then . ·. = .; in other words, for any . we have . · ... = .. This generalises Lozanovskii’s theorem. We also construct an example to show that equality need not hold for a general unconditional body M: . · ... = . does not hold in general.作者: 一瞥 時間: 2025-3-22 21:20 作者: 連鎖,連串 時間: 2025-3-23 04:20 作者: 移植 時間: 2025-3-23 06:57
Asymptotic Infinite-Dimensional Theory of Banach Spaces,others. However, it has been realized recently that such a nice and elegant structural theory does not exist. Recent examples (or counter-examples to classical problems) due to Gowers and Maurey [GM] and Gowers [G.2], [G.3] showed much more diversity in the structure of infinite dimensional subspaces of Banach spaces than was expected.作者: 極大痛苦 時間: 2025-3-23 11:28 作者: Harridan 時間: 2025-3-23 17:09
Conference proceedings 1995ions" of this seminar such as probabilistic methods in functional analysis, non-linear theory, harmonic analysis and especially the local theory of Banach spaces and its connection to classical convexity theory in IRn. The papers in this volume are original research papers and include an invited sur作者: 憤怒事實 時間: 2025-3-23 20:04
https://doi.org/10.1007/978-3-0348-9090-8Finite; Fourier transform; Hilbert space; calculus; function; functional analysis; geometry; harmonic analy作者: ANTIC 時間: 2025-3-24 00:19 作者: 美麗的寫 時間: 2025-3-24 03:26 作者: 使閉塞 時間: 2025-3-24 06:52 作者: 護(hù)航艦 時間: 2025-3-24 11:33 作者: 逗留 時間: 2025-3-24 16:22
https://doi.org/10.1007/978-0-387-68367-6pace with an unconditional basis has an arbitrarily distortable subspace. An important part of the proof, due to Milman and Tomczak-Jaegermann [4], is the statement that a space with a basis with no arbitrarily distortable subspace must have a subspace that is asymptotically ... This means that ther作者: 謙虛的人 時間: 2025-3-24 19:07
https://doi.org/10.1007/978-3-531-90081-0here exist ..,…, .. ? . such that .. ? .{..…, ..} and. This answers a question of V. Milman which appeared during a GAFA seminar talk about the hyperplane problem. We add logarithmical estimates concerning the hyperplane conjecture for proportional subspaces and quotients of Banach spaces with uncon作者: Comprise 時間: 2025-3-25 01:39 作者: 光滑 時間: 2025-3-25 06:54 作者: FATAL 時間: 2025-3-25 08:48 作者: FLINT 時間: 2025-3-25 14:09
https://doi.org/10.1007/978-3-476-05878-2. – ..| for all ., ., does it follow that. where |. | is the Euclidean norm and B(.) is the ball centered at . and of radius .? Under some additional assumptions, we give a probabilistic proof of this and of other related results.作者: 效果 時間: 2025-3-25 17:40
https://doi.org/10.1007/978-3-531-90081-0here exist ..,…, .. ? . such that .. ? .{..…, ..} and. This answers a question of V. Milman which appeared during a GAFA seminar talk about the hyperplane problem. We add logarithmical estimates concerning the hyperplane conjecture for proportional subspaces and quotients of Banach spaces with unconditional basis.作者: LUT 時間: 2025-3-25 22:24 作者: indecipherable 時間: 2025-3-26 02:22
Projection Functions on Higher Rank Grassmannians,ow that the behaviour in the case of higher rank manifolds is often very different from the rank 1 case. We also study the images of projection functions under Radon transforms. If X is an .-dimensional normed space, and . denotes the Banach-Mazur distance, then .(., ..) ≤ ...作者: 倔強(qiáng)一點 時間: 2025-3-26 04:25 作者: itinerary 時間: 2025-3-26 08:29 作者: 空氣傳播 時間: 2025-3-26 15:25 作者: inculpate 時間: 2025-3-26 17:07 作者: 原始 時間: 2025-3-26 20:56 作者: 攤位 時間: 2025-3-27 01:27 作者: garrulous 時間: 2025-3-27 07:07 作者: 粗糙濫制 時間: 2025-3-27 10:58 作者: 雪崩 時間: 2025-3-27 15:23 作者: Factorable 時間: 2025-3-27 21:08 作者: 勉強(qiáng) 時間: 2025-3-27 23:51
In Pursuit of the Perfect Image,It is well known that the Euclidean and hyperbolic (Lobachevsky-Bolyai) spaces .., .. of the same dimension . are homeomorphic. V. A. Efremovich ([1], [2]) proved in 1945, that .. and .. are not uniformly homeomorphic; this means that there does not exist any homeomorphism between them that is uniform together with its inverse.作者: 地名詞典 時間: 2025-3-28 04:30
Distinction, Exclusivity and WhitenessIn this note we show that every Banach space . not containing .. uniformly and with unconditional basis contains an arbitrarily distortable subspace.作者: GLUE 時間: 2025-3-28 10:14
https://doi.org/10.1007/978-3-658-17025-7We take notation and definitions from the preceding Note [M].作者: WAIL 時間: 2025-3-28 13:49 作者: Ardent 時間: 2025-3-28 17:18 作者: 胰臟 時間: 2025-3-28 19:10
https://doi.org/10.1007/978-1-4612-2140-1Let . = (..) be positive definite Hermitian . × . matrix. We prove a following strengthening of the Hadamard inequality:.We give similar estimate in the case of non-Hermitian matrix. We use these results for a short proof of the existence of Von Koh’s infinite determinants, and also give a strong isoperimetric inequality for simplices in ?.作者: 憂傷 時間: 2025-3-28 23:28 作者: 蛤肉 時間: 2025-3-29 06:39 作者: 一再煩擾 時間: 2025-3-29 07:14 作者: 緊張過度 時間: 2025-3-29 12:31
,Remarks on Bourgain’s Problem on Slicing of Convex Bodies,For a convex symmetric body . ? ?. we define a number .. by:. If the minimum is attained for . = . we say that . is in isotropic position. Any K has an affine image which is in isotropic position.作者: GREG 時間: 2025-3-29 18:28
A Note on the Banach-Mazur Distance to the Cube,If . is an .-dimensional normed space, and . denotes the Banach-Mazur distance, then .(., ?.) ≤ ...作者: gentle 時間: 2025-3-29 23:05
Uniform Non-Equivalence between Euclidean and Hyperbolic Spaces,It is well known that the Euclidean and hyperbolic (Lobachevsky-Bolyai) spaces .., .. of the same dimension . are homeomorphic. V. A. Efremovich ([1], [2]) proved in 1945, that .. and .. are not uniformly homeomorphic; this means that there does not exist any homeomorphism between them that is uniform together with its inverse.作者: 貪婪性 時間: 2025-3-30 03:03
A Remark about Distortion,In this note we show that every Banach space . not containing .. uniformly and with unconditional basis contains an arbitrarily distortable subspace.作者: Conjuction 時間: 2025-3-30 04:45
Symmetric Distortion in ,,,We take notation and definitions from the preceding Note [M].作者: ACME 時間: 2025-3-30 09:52
,On the Richness of the Set of ,’s in Krivine’s Theorem,We give examples of two Banach spaces. One Banach space has no spreading model which contains .. (1 ≤ . < ∞) or ... The other space has an unconditional basis for which .. (1 ≥ . < ∞) and .. are block finitely represented in all block bases.作者: 牢騷 時間: 2025-3-30 15:24 作者: 嚴(yán)厲譴責(zé) 時間: 2025-3-30 19:33
Determinant Inequalities with Applications to Isoperimatrical Inequalities,Let . = (..) be positive definite Hermitian . × . matrix. We prove a following strengthening of the Hadamard inequality:.We give similar estimate in the case of non-Hermitian matrix. We use these results for a short proof of the existence of Von Koh’s infinite determinants, and also give a strong isoperimetric inequality for simplices in ?.作者: 說笑 時間: 2025-3-30 23:24 作者: considerable 時間: 2025-3-31 01:08 作者: 不透氣 時間: 2025-3-31 07:44
Projection Functions on Higher Rank Grassmannians,ow that the behaviour in the case of higher rank manifolds is often very different from the rank 1 case. We also study the images of projection functions under Radon transforms. If X is an .-dimensional normed space, and . denotes the Banach-Mazur distance, then .(., ..) ≤ ...作者: Foregery 時間: 2025-3-31 13:13
On the Volume of Unions and Intersections of Balls in Euclidean Space,. – ..| for all ., ., does it follow that. where |. | is the Euclidean norm and B(.) is the ball centered at . and of radius .? Under some additional assumptions, we give a probabilistic proof of this and of other related results.作者: 閑逛 時間: 2025-3-31 16:48 作者: NOTCH 時間: 2025-3-31 19:55
Proportional Subspaces of Spaces with Unconditional Basis Have Good Volume Properties,here exist ..,…, .. ? . such that .. ? .{..…, ..} and. This answers a question of V. Milman which appeared during a GAFA seminar talk about the hyperplane problem. We add logarithmical estimates concerning the hyperplane conjecture for proportional subspaces and quotients of Banach spaces with uncon作者: insert 時間: 2025-3-31 22:55
Asymptotic Infinite-Dimensional Theory of Banach Spaces,e 50s and 60s; goals of the theory had direct roots in and were natural expansion of problems from the times of Banach. Most of surveys and books of that period directly or indirectly discussed such problems as the existence of unconditional basic sequences, the c.-..-reflexive subspace problem and 作者: biosphere 時間: 2025-4-1 04:36
Two Unexpected Examples Concerning Differentiability of Lipschitz Functions on Banach Spaces,rentiability of Lipschitz functions between Banach spaces. Recall that these concepts are: Gateaux derivative of a mapping φ: . → . at . ∈ ., which is defined as a continuous linear map φ′ (.): . → . verifying. for every . ∈ ., and Fréchet derivative which, in addition, requests that the above limit
