| 21. | For fun i wrote a class that can display random walks, shown here.
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| 22. | If ? is nonzero, the random walk will vary about a linear trend.
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| 23. | A Wiener process is the scaling limit of random walk in dimension 1.
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| 24. | The random walk progresses uninterrupted until it eventually links with the prevailing maze.
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| 25. | They can be thought of as sums of random walks in different arithmetic systems.
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| 26. | Then I used my distribution to generate a random walk.
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| 27. | A L�vy flight is a random walk that is occasionally disrupted by large movements.
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| 28. | :: : A useful analogy is a simple random walk on the Euclidean plane.
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| 29. | A key work on random walk was done in the late 1980s by Profs.
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| 30. | Various types of random walks are of interest, which can differ in several ways.
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