標題: Titlebook: Geometric Aspects of Functional Analysis; Israel Seminar (GAFA Bo‘az Klartag,Emanuel Milman Book 2020 Springer Nature Switzerland AG 2020 A [打印本頁] 作者: 輕舟 時間: 2025-3-21 17:53
書目名稱Geometric Aspects of Functional Analysis影響因子(影響力)
書目名稱Geometric Aspects of Functional Analysis影響因子(影響力)學科排名
書目名稱Geometric Aspects of Functional Analysis網絡公開度
書目名稱Geometric Aspects of Functional Analysis網絡公開度學科排名
書目名稱Geometric Aspects of Functional Analysis被引頻次
書目名稱Geometric Aspects of Functional Analysis被引頻次學科排名
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書目名稱Geometric Aspects of Functional Analysis年度引用學科排名
書目名稱Geometric Aspects of Functional Analysis讀者反饋
書目名稱Geometric Aspects of Functional Analysis讀者反饋學科排名
作者: 不可侵犯 時間: 2025-3-21 22:18
,The Lower Bound for Koldobsky’s Slicing Inequality via Random Rounding,and all . . Our bound is optimal, up to the value of the universal constant. It improves slightly upon the results of the first named author and Koldobsky, which included a doubly-logarithmic error. The proof is based on an efficient way of discretizing the unit sphere.作者: 模范 時間: 2025-3-22 04:16
Two-Sided Estimates for Order Statistics of Log-Concave Random Vectors,uncorrelated coordinates. Our bounds are exact up to multiplicative universal constants in the unconditional case for all . and in the isotropic case for .?≤?.???... We also derive two-sided estimates for expectations of sums of . largest moduli of coordinates for some classes of random vectors.作者: ABHOR 時間: 2025-3-22 05:38
,Further Investigations of Rényi Entropy Power Inequalities and an Entropic Characterization of s-CoBobkov and Chistyakov (IEEE Trans Inform Theory 61(2):708–714, 2015) fails when the Rényi parameter .?∈?(0, 1), we show that random vectors with .-concave densities do satisfy such a Rényi entropy power inequality. Along the way, we establish the convergence in the Central Limit Theorem for Rényi en作者: grieve 時間: 2025-3-22 11:49 作者: 土產 時間: 2025-3-22 15:52
Concentration of the Intrinsic Volumes of a Convex Body,quence of intrinsic volumes. The main result states that the intrinsic volume sequence concentrates sharply around a specific index, called the central intrinsic volume. Furthermore, among all convex bodies whose central intrinsic volume is fixed, an appropriately scaled cube has the intrinsic volum作者: 土產 時間: 2025-3-22 17:48
Two Remarks on Generalized Entropy Power Inequalities,nicity and entropy comparison of weighted sums of independent identically distributed log-concave random variables. We also present a complex analogue of a recent dependent entropy power inequality of Hao and Jog, and give a very simple proof.作者: 正式通知 時間: 2025-3-23 00:56
On the Geometry of Random Polytopes,ric random variable that has variance 1, let Γ?=?(..) be an .?×?. random matrix whose entries are independent copies of ., and set .., …, .. to be the rows of Γ. Then under minimal assumptions on . and as long as .?≥?.., with high probability 作者: 大吃大喝 時間: 2025-3-23 05:06 作者: dagger 時間: 2025-3-23 08:42 作者: arrogant 時間: 2025-3-23 11:14 作者: Abominate 時間: 2025-3-23 16:58
Book 2020s that go beyond the Brunn–Minkowski theory. One of the major current research directions addressedis the identification of lower-dimensional structures with remarkable properties in rather arbitrary high-dimensional objects. In addition to functional analytic results, connections to Computer Scienc作者: 動機 時間: 2025-3-23 21:16
Reciprocals and Flowers in Convexity,s own properties, which combine to create the various properties of the polarity map..We study the various relations between the four maps ., °, ? and Φ and use these relations to derive some of their properties. For example, we show that a convex body . is a reciprocal body if and only if its flowe作者: 甜得發(fā)膩 時間: 2025-3-23 23:44
Mika Vainio,Pekka Appelqvist,Aarne Halmes own properties, which combine to create the various properties of the polarity map..We study the various relations between the four maps ., °, ? and Φ and use these relations to derive some of their properties. For example, we show that a convex body . is a reciprocal body if and only if its flowe作者: Rodent 時間: 2025-3-24 05:17 作者: ABYSS 時間: 2025-3-24 09:59 作者: Capitulate 時間: 2025-3-24 13:58 作者: 諂媚于人 時間: 2025-3-24 18:07
Book 2020erstood in a broad sense. Two classical topics represented are the Concentration of Measure Phenomenon in the Local Theory of Banach Spaces, which has recently had triumphs in Random Matrix Theory, and the Central Limit Theorem, one of the earliest examples of regularity and order in high dimensions作者: Foolproof 時間: 2025-3-24 22:56 作者: Carcinogen 時間: 2025-3-25 00:48
Asynchronous Distributed Checkpointingrated result of Barron (Ann Probab 14:336–342, 1986). Additionally, we give an entropic characterization of the class of .-concave densities, which extends a classical result of Cover and Zhang (IEEE Trans Inform Theory 40(4):1244–1246, 1994).作者: 免費 時間: 2025-3-25 06:25
A Generalized Central Limit Conjecture for Convex Bodies,t (up to a small factor) to the KLS conjecture. Any polynomial improvement in the current KLS bound of .. in . implies the generalized CLT, and vice versa. This tight connection suggests that the generalized CLT might provide insight into basic open questions in asymptotic convex geometry.作者: BALK 時間: 2025-3-25 07:51
,Further Investigations of Rényi Entropy Power Inequalities and an Entropic Characterization of s-Corated result of Barron (Ann Probab 14:336–342, 1986). Additionally, we give an entropic characterization of the class of .-concave densities, which extends a classical result of Cover and Zhang (IEEE Trans Inform Theory 40(4):1244–1246, 1994).作者: emulsify 時間: 2025-3-25 13:38 作者: MAPLE 時間: 2025-3-25 18:52 作者: 小丑 時間: 2025-3-25 22:09
Small Ball Probability for the Condition Number of Random Matrices,mbination of known results and techniques, it was not noticed in the literature before. As a key step of the proof, we apply estimates for the singular values of ., . obtained (under some additional assumptions) by Nguyen.作者: Crohns-disease 時間: 2025-3-26 03:35 作者: CRATE 時間: 2025-3-26 07:46
Distributed Autonomous Robotic System 6A classical theorem of Alon and Milman states that any . dimensional centrally symmetric convex body has a projection of dimension . which is either close to the .-dimensional Euclidean ball or to the .-dimensional cross-polytope. We extended this result to non-symmetric convex bodies.作者: 朝圣者 時間: 2025-3-26 09:01 作者: 無底 時間: 2025-3-26 14:37 作者: Confess 時間: 2025-3-26 19:00 作者: milligram 時間: 2025-3-26 21:30
Moments of the Distance Between Independent Random Vectors,We derive various sharp bounds on moments of the distance between two independent random vectors taking values in a Banach space.作者: 毗鄰 時間: 2025-3-27 03:41 作者: Anonymous 時間: 2025-3-27 07:28 作者: amyloid 時間: 2025-3-27 09:54
Polylog Dimensional Subspaces of ,,We show that a subspace of . of dimension . contains 2-isomorphic copies of . where . tends to infinity with . .. More precisely, for every .?>?0, we show that any subspace of . of dimension . contains a subspace of dimension . of distance at most 1?+?. from ..作者: 膽小鬼 時間: 2025-3-27 14:51
On a Formula for the Volume of Polytopes,We carry out an elementary proof of a formula for the volume of polytopes, due to A. Esterov, from which it follows that the mixed volume of polytopes depends only on the product of their support functions.作者: Mirage 時間: 2025-3-27 19:58
Besonderheiten beim Kauf aus der Insolvenztion is close to a Gaussian, with the quantitative difference determined asymptotically by the Cheeger/Poincare/KLS constant. Here we propose a generalized CLT for marginals along random directions drawn from any isotropic log-concave distribution; namely, for ., . drawn independently from isotropic作者: Pruritus 時間: 2025-3-28 00:12 作者: ascend 時間: 2025-3-28 02:47
Understanding XML Web Services,uncorrelated coordinates. Our bounds are exact up to multiplicative universal constants in the unconditional case for all . and in the isotropic case for .?≤?.???... We also derive two-sided estimates for expectations of sums of . largest moduli of coordinates for some classes of random vectors.作者: FUSC 時間: 2025-3-28 08:09
Asynchronous Distributed CheckpointingBobkov and Chistyakov (IEEE Trans Inform Theory 61(2):708–714, 2015) fails when the Rényi parameter .?∈?(0, 1), we show that random vectors with .-concave densities do satisfy such a Rényi entropy power inequality. Along the way, we establish the convergence in the Central Limit Theorem for Rényi en作者: 不連貫 時間: 2025-3-28 13:19
Graph Theory and?Attitude Representations satisfies the small ball probability estimate . where .?>?0 may only depend on the sub-Gaussian moment. Although the estimate can be obtained as a combination of known results and techniques, it was not noticed in the literature before. As a key step of the proof, we apply estimates for the singula作者: 初學者 時間: 2025-3-28 15:01
Keitarou Naruse,Yukinori Kakazuquence of intrinsic volumes. The main result states that the intrinsic volume sequence concentrates sharply around a specific index, called the central intrinsic volume. Furthermore, among all convex bodies whose central intrinsic volume is fixed, an appropriately scaled cube has the intrinsic volum作者: 綁架 時間: 2025-3-28 18:54 作者: preeclampsia 時間: 2025-3-28 23:50 作者: 防止 時間: 2025-3-29 06:12
Mika Vainio,Pekka Appelqvist,Aarne Halmeconvex bodies of the form “1∕.”. The map .?.. sending a body to its reciprocal is a duality on the class of reciprocal bodies, and we study its properties..To connect this new map with the classic polarity we use another construction, associating to each convex body . a star body which we call its f作者: Gum-Disease 時間: 2025-3-29 08:47
Distributed Autonomous Robotic Systems 8l ., .?∈{1, …, .} and small enough .?=?.(..), where .?>?0 is a universal constant, it must be the case that .?≥?2.. This stands in contrast to the metric theory of commutative .. spaces, as it is known that for any .?≥?1, any . points in .. embed exactly in . for .?=?.(.???1)∕2..Our proof is based o作者: EVADE 時間: 2025-3-29 12:38
https://doi.org/10.1007/978-3-030-39536-0 of the convex sets grows with the number of birational operations. In the case of complex surfaces we explain how to associate a linear program to certain sequences of blow-ups and how to reduce verifying the asymptotic log positivity to checking feasibility of the program.作者: 做作 時間: 2025-3-29 18:00 作者: 上坡 時間: 2025-3-29 23:24 作者: Hectic 時間: 2025-3-30 00:59 作者: Lacerate 時間: 2025-3-30 06:52 作者: EXPEL 時間: 2025-3-30 09:15
Additional Remoting Techniques,and all . . Our bound is optimal, up to the value of the universal constant. It improves slightly upon the results of the first named author and Koldobsky, which included a doubly-logarithmic error. The proof is based on an efficient way of discretizing the unit sphere.作者: Clumsy 時間: 2025-3-30 12:25 作者: initiate 時間: 2025-3-30 19:32
Keitarou Naruse,Yukinori Kakazuquence of intrinsic volumes. The main result states that the intrinsic volume sequence concentrates sharply around a specific index, called the central intrinsic volume. Furthermore, among all convex bodies whose central intrinsic volume is fixed, an appropriately scaled cube has the intrinsic volume sequence with maximum entropy.作者: 階層 時間: 2025-3-30 21:23
Distributed Autonomous Robotic Systems 2nicity and entropy comparison of weighted sums of independent identically distributed log-concave random variables. We also present a complex analogue of a recent dependent entropy power inequality of Hao and Jog, and give a very simple proof.作者: Dawdle 時間: 2025-3-31 03:05
Experiment of Self-repairing Modular Machineric random variable that has variance 1, let Γ?=?(..) be an .?×?. random matrix whose entries are independent copies of ., and set .., …, .. to be the rows of Γ. Then under minimal assumptions on . and as long as .?≥?.., with high probability 作者: 蟄伏 時間: 2025-3-31 06:41 作者: GIDDY 時間: 2025-3-31 11:37
