Artykuły w czasopismach: „Random processes”

1

Alexander, Kenneth S., i Steven A. Kalikow. "Random Stationary Processes". Annals of Probability 20, nr 3 (lipiec 1992): 1174–98. http://dx.doi.org/10.1214/aop/1176989685.

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2

ROBALEWSKA, H. D., i N. C. WORMALD. "Random Star Processes". Combinatorics, Probability and Computing 9, nr 1 (styczeń 2000): 33–43. http://dx.doi.org/10.1017/s096354839900406x.

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3

Aitken, G. J. M. "Illustrating Random Processes with Random Phase Modulation". International Journal of Electrical Engineering & Education 23, nr 2 (kwiecień 1986): 151–58. http://dx.doi.org/10.1177/002072098602300209.

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Randomly phase-modulated cosines are a source of examples for illustrating the topics of variance, autocorrelation, conditional probability and filtering. Mathematical manipulations are neither difficult nor tedious despite the non-linear relationship between measured quantities and the phase noise. The basic mathematical framework is presented in the context of examples which include synchronous detection in the presence of phase perturbations.

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4

Lyashenko, N. N. "Graphs of Random Processes as Random Sets". Theory of Probability & Its Applications 31, nr 1 (marzec 1987): 72–80. http://dx.doi.org/10.1137/1131006.

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5

Applebaum, David, Geoffrey Grimmett, David Stirzaker, Marek Capiński, Thomas Zastawniak i Marek Capinski. "Probability and Random Processes". Mathematical Gazette 86, nr 505 (marzec 2002): 185. http://dx.doi.org/10.2307/3621637.

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6

Foutz, Robert V., G. R. Grimmett i D. R. Stirzaker. "Probability and Random Processes." Journal of the American Statistical Association 88, nr 424 (grudzień 1993): 1475. http://dx.doi.org/10.2307/2291308.

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Stoyanov, Jordan. "Probability and Random Processes". Journal of the Royal Statistical Society: Series A (Statistics in Society) 170, nr 4 (październik 2007): 1183–84. http://dx.doi.org/10.1111/j.1467-985x.2007.00506_12.x.

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8

Meyer, Mary C., i Donald G. Childers. "Probability and Random Processes". Journal of the American Statistical Association 94, nr 447 (wrzesień 1999): 988. http://dx.doi.org/10.2307/2670024.

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9

Esmaili, Ali. "Probability and Random Processes". Technometrics 47, nr 3 (sierpień 2005): 375. http://dx.doi.org/10.1198/tech.2005.s294.

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Fotopoulos, Stergios B. "Probability and Random Processes". Technometrics 49, nr 3 (sierpień 2007): 365. http://dx.doi.org/10.1198/tech.2007.s516.

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Krishnan, V., i S. Lakshmivarahan. "Probability and Random Processes". IIE Transactions 40, nr 2 (23.11.2007): 160. http://dx.doi.org/10.1080/07408170701623260.

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12

Stirzaker, David. "PROCESSES WITH RANDOM REGULATION". Probability in the Engineering and Informational Sciences 21, nr 1 (15.12.2006): 1–17. http://dx.doi.org/10.1017/s0269964807070015.

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We consider a class of stochastic models for systems subject to random regulation. We derive expressions for the distribution of the intervals between regulating instants and for the transient and equilibrium properties of the process. Some of these are evaluated explicitly for some models of interest.

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13

Thompson, W. A., G. R. Grimmett i D. R. Stirzaker. "Probability and Random Processes." Journal of the American Statistical Association 80, nr 391 (wrzesień 1985): 788. http://dx.doi.org/10.2307/2288525.

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14

Clifford, Peter, i David Stirzaker. "History-dependent random processes". Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences 464, nr 2093 (5.02.2008): 1105–24. http://dx.doi.org/10.1098/rspa.2007.0291.

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Ulam has defined a history-dependent random sequence by the recursion X n +1 = X n + X U ( n ) , where ( U ( n ); n ≥1) is a sequence of independent random variables with U ( n ) uniformly distributed on {1, …, n } and X 1 =1. We introduce a new class of continuous-time history-dependent random processes regulated by Poisson processes. The simplest of these, a univariate process regulated by a homogeneous Poisson process, replicates in continuous time the essential properties of Ulam's sequence, and greatly facilitates its analysis. We consider several generalizations and extensions of this, including bivariate and multivariate coupled history-dependent processes, and cases when the dependence on the past is not uniform. The analysis of the discrete-time formulations of these models would be at the very least an extremely formidable project, but we determine the asymptotic growth rates of their means and higher moments with relative ease.

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15

Han, Lengyi, W. John Braun i Jason Loeppky. "Random coefficient minification processes". Statistical Papers 61, nr 4 (23.04.2018): 1741–62. http://dx.doi.org/10.1007/s00362-018-1000-6.

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16

Pishel', R., i A. A. Yantsevich. "Dilations of random processes". Journal of Soviet Mathematics 48, nr 5 (luty 1990): 566–70. http://dx.doi.org/10.1007/bf01095626.

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17

Horowitz, J. "Measure-valued random processes". Zeitschrift für Wahrscheinlichkeitstheorie und verwandte Gebiete 70, nr 2 (sierpień 1985): 213–36. http://dx.doi.org/10.1007/bf02451429.

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18

Rota, Gian-Carlo. "Stationary random processes associated with point processes". Advances in Mathematics 57, nr 2 (sierpień 1985): 208. http://dx.doi.org/10.1016/0001-8708(85)90061-1.

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19

FRYZ, Mykhailo, i Bogdana MLYNKO. "DISCRETE-TIME CONDITIONAL LINEAR RANDOM PROCESSES AND THEIR PROPERTIES". Herald of Khmelnytskyi National University. Technical sciences 309, nr 3 (26.05.2022): 7–12. http://dx.doi.org/10.31891/2307-5732-2022-309-3-7-12.

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Continuous-time conditional linear random process is represented as a stochastic integral of a random kernel driven by a process with independent increments. Such processes are used in the problems of mathematical modelling, computer simulation, and processing of stochastic signals, the physical nature of which generates them to be represented as the sum of many random impulses that occur at Poisson moments. Impulses are stochastically dependent functions, in contrast to another well-known mathematical model which is a linear random process, that has a similar structure but is represented as the sum of a large amount of independent random impulses that occur at Poisson moments of time. The application areas of these models are mathematical modelling, computer simulation, and processing of electroencephalographic signals, cardio signals, resource consumption processes (such as electricity consumption, water consumption, gas consumption), radar signals, etc. A discrete-time conditional linear random process has been defined in the paper, the relationships with corresponding continuous-time model has been shown. According to the given definition the discrete-time conditional linear random process can be considered as an output of linear digital filter with random parameters on the input of the white noise which is infinitely divisible distributed. Moment functions of first and second order have been analyzed. In particular, the expressions for mathematical expectation, variance and covariance function have been obtained. The results can be utilized to study the probabilistic characteristics of the investigated information stochastic signals, which will depend on the properties of the corresponding kernel and white noise. In particular, the conditions for the process to be wide-sense stationary have been represented.

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20

Khimenko, V. I. "Random processes with random transitions between stable states". Information and Control Systems, nr 3 (21.06.2019): 82–93. http://dx.doi.org/10.31799/1684-8853-2019-3-82-93.

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Introduction: Studying random processes with several stable states and random transitions between them is important because it opens a wide range of practical problems. The detailed information structure is not studied well enough, and there is no unified approach to the description and probabilistic analysis of such processes.Purpose: Studying the main probabilistic characteristics of random processes with two stable states, and probabilistic analysis of control over chaotic transitions under various control actions.Results: We show the ways to represent and preliminarily analyze random processes with two stable states on the phase plane and in the pseudophase space. A general probabilistic model for the processes in question is proposed in the form of a two-component probabilistic «mixture» of distributions. A probabilistic analysis was carried out for the principles of control over random transitions between different states. We have defined the basic probabilistic characteristics for the processes in a management action with a variety of spectral-correlation properties and a changeable threshold for random transitions. The Poisson model of a random transition flow is analyzed with an example of «high» threshold levels.Practical relevance: The methods of visual, qualitative and analytical research in studying dynamic systems with several stable states can be combined. The proposed probabilistic models, regardless of the physical nature of the processes under consideration, can be used in problems of probabilistic analysis, control over probabilistic structure of random transitions, and simulation of physical, technical or biological systems with random switching.

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21

Filip, Silviu, Aurya Javeed i Lloyd N. Trefethen. "Smooth Random Functions, Random ODEs, and Gaussian Processes". SIAM Review 61, nr 1 (styczeń 2019): 185–205. http://dx.doi.org/10.1137/17m1161853.

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22

Wormald, Nicholas C. "Differential Equations for Random Processes and Random Graphs". Annals of Applied Probability 5, nr 4 (listopad 1995): 1217–35. http://dx.doi.org/10.1214/aoap/1177004612.

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23

Wells, Martin T. "Statistics of Random Processes I: General Theory, Statistics of Random Processes II: Applications". Journal of the American Statistical Association 96, nr 456 (grudzień 2001): 1526–27. http://dx.doi.org/10.1198/jasa.2001.s428.

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24

Applebaum, Dave, G. Samorodnitsky i M. S. Taqqu. "Stable Non-Gaussian Random Processes". Mathematical Gazette 79, nr 486 (listopad 1995): 625. http://dx.doi.org/10.2307/3618123.

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25

Peled, Ron, Vladas Sidoravicius i Alexandre Stauffer. "Strongly Correlated Random Interacting Processes". Oberwolfach Reports 15, nr 1 (4.01.2019): 187–253. http://dx.doi.org/10.4171/owr/2018/4.

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26

Панчева, Елизавета И., Elisaveta I. Pancheva, Ekaterina T. Kolkovska, Ekaterina T. Kolkovska, Pavlina Kalcheva Jordanova i Pavlina Kalcheva Jordanova. "Random time-changed extremal processes". Teoriya Veroyatnostei i ee Primeneniya 51, nr 4 (2006): 752–72. http://dx.doi.org/10.4213/tvp23.

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27

LI, ZHIMING, QIN WANG i YUANFANG WU. "WAVELET ANALYSIS FOR RANDOM PROCESSES". Modern Physics Letters A 16, nr 09 (21.03.2001): 583–88. http://dx.doi.org/10.1142/s0217732301003620.

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The role of wavelet transformation in the study of random processes is investigated. It is shown that wavelet transformation does not change the scaling index of random multiplicative cascade process. On the other hand, for pure random process, wavelet transformation is able to suppress the trivial fluctuations, coming from probability conservation, which will show an apparent increase in moments with the diminishing of bin size.

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28

Vanhoff, Barry, i Steve Elgar. "Simulating Quadratically Nonlinear Random Processes". International Journal of Bifurcation and Chaos 07, nr 06 (czerwiec 1997): 1367–74. http://dx.doi.org/10.1142/s0218127497001084.

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A technique to generate realizations of quadratically nonlinear non-Gaussian time series with a desired ("target") power spectrum and bispectrum is presented. Specifically, by generating a Gaussian time series (using amplitude information from the target power spectrum and random phases) and passing it through a quadratic filter (that uses phase information from the target bispectrum), a realization of a quadratically nonlinear random process with a specified power spectrum and bispectrum can be produced. Second- and third-order statistics from many realizations of simulated nonlinear time series compare well to those from the original time series providing the target power spectrum and bispectrum, with deviations consistent with theory. The simulation technique is shown to simulate accurately ocean waves in shallow water, which are well known to be quadratically nonlinear.

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29

Ayache, A., i M. S. Taqqu. "Multifractional processes with random exponent". Publicacions Matemàtiques 49 (1.07.2005): 459–86. http://dx.doi.org/10.5565/publmat_49205_11.

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30

Lavielle, M. "Optimal segmentation of random processes". IEEE Transactions on Signal Processing 46, nr 5 (maj 1998): 1365–73. http://dx.doi.org/10.1109/78.668798.

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31

Pancheva, E. I., E. T. Kolkovska i P. K. Jordanova. "Random Time-Changed Extremal Processes". Theory of Probability & Its Applications 51, nr 4 (styczeń 2007): 645–62. http://dx.doi.org/10.1137/s0040585x97982694.

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32

Rothmann, Mark D., i Hammou El Barmi. "Stochastic processes involving random deletion". Journal of Applied Probability 38, nr 1 (marzec 2001): 95–107. http://dx.doi.org/10.1239/jap/996986646.

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We consider a system where units having magnitudes arrive according to a nonhomogeneous Poisson process, remain there for a random period and then depart. Eventually, at any point in time only a portion of those units which have entered the system remain. Of interest are the finite time properties and limiting behaviors of the distribution of magnitudes among the units present in the system and among those which have departed from the system. We will derive limiting results for the empirical distribution of magnitudes among the active (departed) units. These results are also shown to extend to systems having stages or steps through which units must proceed. Examples are given to illustrate these results.

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33

Saporta, Benoîte de, Anne Gégout-Petit i Laurence Marsalle. "Random coefficients bifurcating autoregressive processes". ESAIM: Probability and Statistics 18 (2014): 365–99. http://dx.doi.org/10.1051/ps/2013042.

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34

Iqbal, Amer, Babar A. Qureshi, Khurram Shabbir i Muhammad A. Shehper. "Brane webs and random processes". International Journal of Modern Physics A 30, nr 33 (26.11.2015): 1550202. http://dx.doi.org/10.1142/s0217751x15502024.

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We study (p, q) 5-brane webs dual to certain N M5-brane configurations and show that the partition function of these brane webs gives rise to cylindric Schur process with period N. This generalizes the previously studied case of period 1. We also show that open string amplitudes corresponding to these brane webs are captured by the generating function of cylindric plane partitions with profile determined by the boundary conditions imposed on the open string amplitudes.

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35

Stadje, W., i S. Zacks. "Telegraph processes with random velocities". Journal of Applied Probability 41, nr 3 (wrzesień 2004): 665–78. http://dx.doi.org/10.1239/jap/1091543417.

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We study a one-dimensional telegraph process (Mt)t≥0 describing the position of a particle moving at constant speed between Poisson times at which new velocities are chosen randomly. The exact distribution of Mt and its first two moments are derived. We characterize the level hitting times of Mt in terms of integro-differential equations which can be solved in special cases.

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36

Howroyd, Douglas C., i Han Yu. "Assouad Dimension of Random Processes". Proceedings of the Edinburgh Mathematical Society 62, nr 1 (16.11.2018): 281–90. http://dx.doi.org/10.1017/s0013091518000433.

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AbstractIn this paper we study the Assouad dimension of graphs of certain Lévy processes and functions defined by stochastic integrals. We do this by introducing a convenient condition which guarantees a graph to have full Assouad dimension and then show that graphs of our studied processes satisfy this condition.

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37

Zubov, Vladimir I. "Random Variables and Stochastic Processes". IFAC Proceedings Volumes 33, nr 16 (lipiec 2000): 403–14. http://dx.doi.org/10.1016/s1474-6670(17)39666-0.

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38

Corte, Aurelio La. "Generation of crosscorrelated random processes". Signal Processing 79, nr 3 (grudzień 1999): 223–34. http://dx.doi.org/10.1016/s0165-1684(99)00097-3.

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39

Kingman, J. F. C. "Random dissections and branching processes". Mathematical Proceedings of the Cambridge Philosophical Society 104, nr 1 (lipiec 1988): 147–51. http://dx.doi.org/10.1017/s0305004100065324.

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For a time in the mid-1970s probabilists were tantalized by a seemingly simple problem posed by Araki and Kakutani[3]. An interval is repeatedly divided by points chosen successively at random, the nth point being uniformly distributed over the largest of the n intervals formed by the first n − 1 points. Is this sequence of points asymptotically uniformly distributed?

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40

Denisov, S. I. "Fractal Dimension of Random Processes". Chaos, Solitons & Fractals 9, nr 9 (wrzesień 1998): 1491–96. http://dx.doi.org/10.1016/s0960-0779(97)00179-3.

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41

Telksnys, L. "Recognition of Nonstationary Random Processes". IFAC Proceedings Volumes 19, nr 5 (maj 1986): 31–36. http://dx.doi.org/10.1016/s1474-6670(17)59763-3.

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42

Samaras, Elias, Masanobu Shinzuka i Akira Tsurui. "ARMA Representation of Random Processes". Journal of Engineering Mechanics 111, nr 3 (marzec 1985): 449–61. http://dx.doi.org/10.1061/(asce)0733-9399(1985)111:3(449).

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43

Rothmann, Mark D., i Hammou El Barmi. "Stochastic processes involving random deletion". Journal of Applied Probability 38, nr 01 (marzec 2001): 95–107. http://dx.doi.org/10.1017/s0021900200018532.

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We consider a system where units having magnitudes arrive according to a nonhomogeneous Poisson process, remain there for a random period and then depart. Eventually, at any point in time only a portion of those units which have entered the system remain. Of interest are the finite time properties and limiting behaviors of the distribution of magnitudes among the units present in the system and among those which have departed from the system. We will derive limiting results for the empirical distribution of magnitudes among the active (departed) units. These results are also shown to extend to systems having stages or steps through which units must proceed. Examples are given to illustrate these results.

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44

Stadje, W., i S. Zacks. "Telegraph processes with random velocities". Journal of Applied Probability 41, nr 03 (wrzesień 2004): 665–78. http://dx.doi.org/10.1017/s0021900200020465.

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We study a one-dimensional telegraph process (Mt)t≥0describing the position of a particle moving at constant speed between Poisson times at which new velocities are chosen randomly. The exact distribution ofMtand its first two moments are derived. We characterize the level hitting times ofMtin terms of integro-differential equations which can be solved in special cases.

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45

Vodák, Rostislav, Michal Bíl i Jiří Sedoník. "Network robustness and random processes". Physica A: Statistical Mechanics and its Applications 428 (czerwiec 2015): 368–82. http://dx.doi.org/10.1016/j.physa.2015.01.056.

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46

Bednorz, Witold. "Hölder Continuity of Random Processes". Journal of Theoretical Probability 20, nr 4 (9.05.2007): 917–34. http://dx.doi.org/10.1007/s10959-007-0094-x.

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47

Shen, Qiang, Ruiqing Zhao i Wansheng Tang. "Random fuzzy alternating renewal processes". Soft Computing 13, nr 2 (22.04.2008): 139–47. http://dx.doi.org/10.1007/s00500-008-0307-y.

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48

Li, Shunqin, Qiang Shen, Wansheng Tang i Ruiqing Zhao. "Random fuzzy delayed renewal processes". Soft Computing 13, nr 7 (20.09.2008): 681–90. http://dx.doi.org/10.1007/s00500-008-0372-2.

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49

Rüschendorf, Ludger. "Inference for random sampling processes". Stochastic Processes and their Applications 32, nr 1 (czerwiec 1989): 129–40. http://dx.doi.org/10.1016/0304-4149(89)90057-4.

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50

Moon, Hee-Jin, Chang-Ho Han i Yong-Kab Choi. "Asymptotic results for random processes". Acta Mathematicae Applicatae Sinica, English Series 33, nr 2 (kwiecień 2017): 363–72. http://dx.doi.org/10.1007/s10255-017-0665-2.

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Artykuły w czasopismach na temat „Random processes”

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