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Artigos de revistas sobre o tema "Nonasymptotic"

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Publicado: 1 de junho de 2024

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1

Berry, Kenneth J., e Paul W. Mielke. "Nonasymptotic Probability Values for Cochran's Q Statistic: A Fortran 77 Program". Perceptual and Motor Skills 82, n.º 1 (fevereiro de 1996): 303–6. http://dx.doi.org/10.2466/pms.1996.82.1.303.

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A nonasymptotic inference procedure for Cochran's Q test for the equality of matched proportions is described. An algorithm and FORTRAN 77 program are provided to compute Cochran's Q test statistic and the associated nonasymptotic probability value. The nonasymptotic method provides improvement over the usual asymptotic chi-squared analysis procedure whenever the effective number of subjects is small or the number of successes is small.
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2

Mielke, Paul W., e Kenneth J. Berry. "Categorical Independence Tests for Large Sparse R-Way Contingency Tables". Perceptual and Motor Skills 95, n.º 2 (outubro de 2002): 606–10. http://dx.doi.org/10.2466/pms.2002.95.2.606.

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A nonasymptotic chi-squared technique is shown to have very useful properties for the analysis of large sparse r-way contingency tables. Examples of analyses of 4 × 5, 5 × 6, 6 × 7. and two 2 × 2 × 2 sparse contingency tables provide comparisons of the nonasymptotic chi-squared technique with asymptotic chi-squared and exact chi-squared techniques. The asymptotic chi-squared analyses yield inflated probability values for the five tables. The nonasymptotic chi-squared technique yields probability values much closer to the exact probability values than the asymptotic chi-squared Technique for the five tables.
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3

Mielke, Paul W., e Kenneth J. Berry. "Nonasymptotic Inferences Based on Cochran's Q Test". Perceptual and Motor Skills 81, n.º 1 (agosto de 1995): 319–22. http://dx.doi.org/10.2466/pms.1995.81.1.319.

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A nonasymptotic inference procedure for Cochran's Q test for the equality of matched proportions is presented. The nonasymptotic method provides improvement over the asymptotic method when there is a small number of subjects and/or a relatively small proportion of successes for subjects.
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4

Tembine, Hamidou. "Nonasymptotic Mean-Field Games". IFAC Proceedings Volumes 47, n.º 3 (2014): 8989–94. http://dx.doi.org/10.3182/20140824-6-za-1003.01869.

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5

Tembine, Hamidou. "Nonasymptotic Mean-Field Games". IEEE Transactions on Cybernetics 44, n.º 12 (dezembro de 2014): 2744–56. http://dx.doi.org/10.1109/tcyb.2014.2315171.

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6

Ibrahim, Sharif, Kevin Sonnanburg, Thomas J. Asaki e Kevin R. Vixie. "Nonasymptotic Densities for Shape Reconstruction". Abstract and Applied Analysis 2014 (2014): 1–14. http://dx.doi.org/10.1155/2014/341910.

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In this work, we study the problem of reconstructing shapes from simple nonasymptotic densities measured only along shape boundaries. The particular density we study is also known as the integral area invariant and corresponds to the area of a disk centered on the boundary that is also inside the shape. It is easy to show uniqueness when these densities are known for all radii in a neighborhood ofr=0, but much less straightforward when we assume that we only know the area invariant and its derivatives for only oner>0. We present variations of uniqueness results for reconstruction (modulo translation and rotation) of polygons and (a dense set of) smooth curves under certain regularity conditions.
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7

Kostina, Victoria, e Sergio Verde. "Nonasymptotic Noisy Lossy Source Coding". IEEE Transactions on Information Theory 62, n.º 11 (novembro de 2016): 6111–23. http://dx.doi.org/10.1109/tit.2016.2562008.

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8

Yang, Wei, Rafael F. Schaefer e H. Vincent Poor. "Wiretap Channels: Nonasymptotic Fundamental Limits". IEEE Transactions on Information Theory 65, n.º 7 (julho de 2019): 4069–93. http://dx.doi.org/10.1109/tit.2019.2904500.

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9

Ben-Yashar, Ruth, e Jacob Paroush. "A nonasymptotic Condorcet jury theorem". Social Choice and Welfare 17, n.º 2 (9 de março de 2000): 189–99. http://dx.doi.org/10.1007/s003550050014.

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10

Tarantino, Angelo Marcello. "Nonasymptotic solution for antiplane cracks". Meccanica 27, n.º 4 (1992): 307–10. http://dx.doi.org/10.1007/bf00424371.

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11

Farrell, Max H., Tengyuan Liang e Sanjog Misra. "Deep Neural Networks for Estimation and Inference". Econometrica 89, n.º 1 (2021): 181–213. http://dx.doi.org/10.3982/ecta16901.

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We study deep neural networks and their use in semiparametric inference. We establish novel nonasymptotic high probability bounds for deep feedforward neural nets. These deliver rates of convergence that are sufficiently fast (in some cases minimax optimal) to allow us to establish valid second‐step inference after first‐step estimation with deep learning, a result also new to the literature. Our nonasymptotic high probability bounds, and the subsequent semiparametric inference, treat the current standard architecture: fully connected feedforward neural networks (multilayer perceptrons), with the now‐common rectified linear unit activation function, unbounded weights, and a depth explicitly diverging with the sample size. We discuss other architectures as well, including fixed‐width, very deep networks. We establish the nonasymptotic bounds for these deep nets for a general class of nonparametric regression‐type loss functions, which includes as special cases least squares, logistic regression, and other generalized linear models. We then apply our theory to develop semiparametric inference, focusing on causal parameters for concreteness, and demonstrate the effectiveness of deep learning with an empirical application to direct mail marketing.
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12

Panov, M. E. "Nonasymptotic approach to Bayesian semiparametric inference". Doklady Mathematics 93, n.º 2 (março de 2016): 155–58. http://dx.doi.org/10.1134/s1064562416020101.

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13

Bretagnolle, J., e P. Massart. "Hungarian Constructions from the Nonasymptotic Viewpoint". Annals of Probability 17, n.º 1 (janeiro de 1989): 239–56. http://dx.doi.org/10.1214/aop/1176991506.

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14

Paouris, G., P. Pivovarov e P. Valettas. "Gaussian Convex Bodies: a Nonasymptotic Approach". Journal of Mathematical Sciences 238, n.º 4 (22 de março de 2019): 537–59. http://dx.doi.org/10.1007/s10958-019-04256-3.

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15

Bou-Rabee, N., e M. Hairer. "Nonasymptotic mixing of the MALA algorithm". IMA Journal of Numerical Analysis 33, n.º 1 (19 de março de 2012): 80–110. http://dx.doi.org/10.1093/imanum/drs003.

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16

Birge, Lucien. "The Grenader Estimator: A Nonasymptotic Approach". Annals of Statistics 17, n.º 4 (dezembro de 1989): 1532–49. http://dx.doi.org/10.1214/aos/1176347380.

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17

Boffetta, G., A. Celani, M. Cencini, G. Lacorata e A. Vulpiani. "Nonasymptotic properties of transport and mixing". Chaos: An Interdisciplinary Journal of Nonlinear Science 10, n.º 1 (março de 2000): 50–60. http://dx.doi.org/10.1063/1.166475.

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18

Schobinger, Markus, Karl Hollaus e Igor Tsukerman. "Nonasymptotic Homogenization of Laminated Magnetic Cores". IEEE Transactions on Magnetics 56, n.º 2 (fevereiro de 2020): 1–4. http://dx.doi.org/10.1109/tmag.2019.2943463.

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19

Tang, S., J. V. Sengers e Z. Y. Chen. "Nonasymptotic critical thermodynamical behavior of fluids". Physica A: Statistical Mechanics and its Applications 179, n.º 3 (dezembro de 1991): 344–77. http://dx.doi.org/10.1016/0378-4371(91)90084-p.

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20

Hartmann, Carsten, e Lorenz Richter. "Nonasymptotic Bounds for Suboptimal Importance Sampling". SIAM/ASA Journal on Uncertainty Quantification 12, n.º 2 (15 de abril de 2024): 309–46. http://dx.doi.org/10.1137/21m1427760.

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21

Kulkarni, Ankur A., e Negar Kiyavash. "Nonasymptotic Upper Bounds for Deletion Correcting Codes". IEEE Transactions on Information Theory 59, n.º 8 (agosto de 2013): 5115–30. http://dx.doi.org/10.1109/tit.2013.2257917.

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22

Zielinski, Ryszard. "Stable estimation of location parameter -nonasymptotic approach". Statistics 19, n.º 2 (janeiro de 1988): 229–31. http://dx.doi.org/10.1080/02331888808802091.

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23

Niedzwiecki, M., e L. Guo. "Nonasymptotic results for finite-memory WLS filters". IEEE Transactions on Automatic Control 36, n.º 2 (1991): 198–206. http://dx.doi.org/10.1109/9.67295.

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24

Polyakov, A. "Discontinuous Lyapunov Functions for Nonasymptotic Stability Analysis". IFAC Proceedings Volumes 47, n.º 3 (2014): 5455–60. http://dx.doi.org/10.3182/20140824-6-za-1003.00867.

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25

Kadalbajoo, M. K., e Y. N. Reddy. "A nonasymptotic method for singular perturbation problems". Journal of Optimization Theory and Applications 55, n.º 1 (outubro de 1987): 73–84. http://dx.doi.org/10.1007/bf00939045.

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26

Csáji, Balázs Csanád, e Bálint Horváth. "Improving Kernel-Based Nonasymptotic Simultaneous Confidence Bands". IFAC-PapersOnLine 56, n.º 2 (2023): 10357–62. http://dx.doi.org/10.1016/j.ifacol.2023.10.1047.

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27

Berry, Kenneth J., e Paul W. Mielke. "Nonasymptotic Significance Tests for Two Measures of Agreement". Perceptual and Motor Skills 93, n.º 1 (agosto de 2001): 109–14. http://dx.doi.org/10.2466/pms.2001.93.1.109.

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28

BERRY, KENNETH. "NONASYMPTOTIC SIGNIFICANCE TESTS FOR TWO MEASURES OF AGREEMENT". Perceptual and Motor Skills 93, n.º 5 (2001): 109. http://dx.doi.org/10.2466/pms.93.5.109-114.

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29

Yang, En-Hui, e Jin Meng. "New Nonasymptotic Channel Coding Theorems for Structured Codes". IEEE Transactions on Information Theory 61, n.º 9 (setembro de 2015): 4534–53. http://dx.doi.org/10.1109/tit.2015.2449852.

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30

Gutkowski, Karin I., Hugo L. Bianchi e M. Laura Japas. "Nonasymptotic Critical Behavior of a Ternary Ionic System". Journal of Physical Chemistry B 111, n.º 10 (março de 2007): 2554–64. http://dx.doi.org/10.1021/jp067069z.

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31

Riabiz, Marina, Tohid Ardeshiri, Ioannis Kontoyiannis e Simon Godsill. "Nonasymptotic Gaussian Approximation for Inference With Stable Noise". IEEE Transactions on Information Theory 66, n.º 8 (agosto de 2020): 4966–91. http://dx.doi.org/10.1109/tit.2020.2996135.

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32

Ding, Yichuan, Dongdong Ge, Simai He e Christopher Thomas Ryan. "A Nonasymptotic Approach to Analyzing Kidney Exchange Graphs". Operations Research 66, n.º 4 (agosto de 2018): 918–35. http://dx.doi.org/10.1287/opre.2017.1717.

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33

Levrard, Clément. "Nonasymptotic bounds for vector quantization in Hilbert spaces". Annals of Statistics 43, n.º 2 (abril de 2015): 592–619. http://dx.doi.org/10.1214/14-aos1293.

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34

Durmus, Alain, e Éric Moulines. "Nonasymptotic convergence analysis for the unadjusted Langevin algorithm". Annals of Applied Probability 27, n.º 3 (junho de 2017): 1551–87. http://dx.doi.org/10.1214/16-aap1238.

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35

Long, Yin, Zhi Chen e Jun Fang. "Nonasymptotic Analysis of Capacity in Massive MIMO Systems". IEEE Wireless Communications Letters 4, n.º 5 (outubro de 2015): 541–44. http://dx.doi.org/10.1109/lwc.2015.2454509.

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36

Zambianchi, Vincenzo, Francesca Bassi, Alex Calisti, Davide Dardari, Michel Kieffer e Gianni Pasolini. "Distributed Nonasymptotic Confidence Region Computation Over Sensor Networks". IEEE Transactions on Signal and Information Processing over Networks 4, n.º 2 (junho de 2018): 308–24. http://dx.doi.org/10.1109/tsipn.2017.2695403.

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37

Majka, Mateusz B., Aleksandar Mijatović e Łukasz Szpruch. "Nonasymptotic bounds for sampling algorithms without log-concavity". Annals of Applied Probability 30, n.º 4 (agosto de 2020): 1534–81. http://dx.doi.org/10.1214/19-aap1535.

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38

Boyer, E., P. Forster e P. Larzabal. "Nonasymptotic Performance Analysis of Beamforming With Stochastic Signals". IEEE Signal Processing Letters 11, n.º 1 (janeiro de 2004): 23–25. http://dx.doi.org/10.1109/lsp.2003.819358.

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39

Boyer, E., P. Forster e P. Larzabal. "Nonasymptotic Statistical Performance of Beamforming for Deterministic Signals". IEEE Signal Processing Letters 11, n.º 1 (janeiro de 2004): 20–22. http://dx.doi.org/10.1109/lsp.2003.819798.

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40

Schirotzek, Winfried. "Nonasymptotic necessary conditions for nonsmooth infinite optimization problems". Journal of Mathematical Analysis and Applications 118, n.º 2 (setembro de 1986): 535–46. http://dx.doi.org/10.1016/0022-247x(86)90280-5.

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41

Berry, Kenneth J., e Paul W. Mielke. "Spearman's Footrule as a Measure of Agreement". Psychological Reports 80, n.º 3 (junho de 1997): 839–46. http://dx.doi.org/10.2466/pr0.1997.80.3.839.

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Spearman's footrule measure of the relationship between two sets of ranks is shown to be a chance-corrected measure of agreement. The footrule is generalized to include tied ranks and a comparison with Spearman's rank-order correlation coefficient is provided. Procedures to determine the nonasymptotic probability of the footrule with tied ranks are presented.
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42

Łatuszyński, Krzysztof, Błażej Miasojedow e Wojciech Niemiro. "Nonasymptotic bounds on the estimation error of MCMC algorithms". Bernoulli 19, n.º 5A (novembro de 2013): 2033–66. http://dx.doi.org/10.3150/12-bej442.

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43

Saha, Ankan, e Ambuj Tewari. "On the Nonasymptotic Convergence of Cyclic Coordinate Descent Methods". SIAM Journal on Optimization 23, n.º 1 (janeiro de 2013): 576–601. http://dx.doi.org/10.1137/110840054.

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44

Aamari, Eddie, e Clément Levrard. "Nonasymptotic rates for manifold, tangent space and curvature estimation". Annals of Statistics 47, n.º 1 (fevereiro de 2019): 177–204. http://dx.doi.org/10.1214/18-aos1685.

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45

Bayer, Christian, Håkon Hoel, Erik von Schwerin e Raúl Tempone. "On NonAsymptotic Optimal Stopping Criteria in Monte Carlo Simulations". SIAM Journal on Scientific Computing 36, n.º 2 (janeiro de 2014): A869—A885. http://dx.doi.org/10.1137/130911433.

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46

Devroye, Luc, e Gábor Lugosi. "Nonasymptotic universal smoothing factors, kernel complexity and Yatracos classes". Annals of Statistics 25, n.º 6 (dezembro de 1997): 2626–37. http://dx.doi.org/10.1214/aos/1030741088.

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47

Klopp, Olga, e Marianna Pensky. "Sparse high-dimensional varying coefficient model: Nonasymptotic minimax study". Annals of Statistics 43, n.º 3 (junho de 2015): 1273–99. http://dx.doi.org/10.1214/15-aos1309.

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48

Luo, Jingjing, Li Yu, Jinbei Zhang e Xinbing Wang. "Nonasymptotic Multicast Throughput and Delay in Multihop Wireless Networks". IEEE Transactions on Vehicular Technology 65, n.º 7 (julho de 2016): 5525–37. http://dx.doi.org/10.1109/tvt.2015.2465963.

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49

Datta, Somnath. "Some Nonasymptotic Bounds for $L_1$ Density Estimation using Kernels". Annals of Statistics 20, n.º 3 (setembro de 1992): 1658–67. http://dx.doi.org/10.1214/aos/1176348791.

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50

Birge, Lucien. "Estimating a Density under Order Restrictions: Nonasymptotic Minimax Risk". Annals of Statistics 15, n.º 3 (setembro de 1987): 995–1012. http://dx.doi.org/10.1214/aos/1176350488.

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