2005
DOI: 10.1017/s0021900200001182
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A planar random motion with an infinite number of directions controlled by the damped wave equation

Abstract: We consider the planar random motion of a particle that moves with constant finite speed c and, at Poisson-distributed times, changes its direction θ with uniform law in [0, 2π). This model represents the natural two-dimensional counterpart of the wellknown Goldstein-Kac telegraph process. For the particle's position (X(t), Y (t)), t > 0, we obtain the explicit conditional distribution when the number of changes of direction is fixed. From this, we derive the explicit probability law f (x, y, t) of (X(t), Y (t… Show more

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Cited by 33 publications
(63 citation statements)
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“…with n ≥ 0 and |x| < ct. These results permit us to point out the relationship between X 0 (t), t > 0, and X 1 (t), t > 0, and the random flights studied by several authors, such as Stadje (1987Stadje ( ), (1989, Kolesnik and Orsingher (2005), De Gregorio and Orsingher (2006), Kolesnik (2006), and Orsingher and De Gregorio (2007). A random flight is a continuoustime random walk defined similarly to X ν (t), but with its direction chosen uniformly on an hypersphere.…”
mentioning
confidence: 57%
See 1 more Smart Citation
“…with n ≥ 0 and |x| < ct. These results permit us to point out the relationship between X 0 (t), t > 0, and X 1 (t), t > 0, and the random flights studied by several authors, such as Stadje (1987Stadje ( ), (1989, Kolesnik and Orsingher (2005), De Gregorio and Orsingher (2006), Kolesnik (2006), and Orsingher and De Gregorio (2007). A random flight is a continuoustime random walk defined similarly to X ν (t), but with its direction chosen uniformly on an hypersphere.…”
mentioning
confidence: 57%
“…In other words, X ν (t), t > 0, defines a whole class of random motions indexed by the parameter ν, namely the level of friction. For ν = 0, we obtain again the uniform distribution on the semicircle with radius 1 and X 0 (t) is exactly the x-component of a planar random flight studied in, for example, Stadje (1987) and Kolesnik and Orsingher (2005). Our first result concerns the conditional characteristic function of X ν (t), t > 0, for a fixed number of Poisson events during the time interval [0, t].…”
Section: Moving Randomly With Frictionmentioning
confidence: 69%
“…The main reason lying in the difficulty of generalizing persistence in dimensions higher than one [22][23][24][25][26][27][28].…”
Section: Introductionmentioning
confidence: 99%
“…These models can be traced back to Pearson's random walk [20,26] and Goldstein-Kac one-dimensional "telegraph process" [28,39] . Random flights have been intensively studied since the introduction of the telegraph process in the early 50's, see for instance [21,29,30,33,36,44] and references therein for a representative sample. An introductory part of [30] provides a short authoritative and up to a date survey of the field.…”
Section: Directionally Reinforced Random Walksmentioning
confidence: 99%
“…Random flights have been intensively studied since the introduction of the telegraph process in the early 50's, see for instance [21,29,30,33,36,44] and references therein for a representative sample. An introductory part of [30] provides a short authoritative and up to a date survey of the field. We remark that, somewhat in contrary to directionally reinforced random walks, the main focus of the research in this area is on finding explicit form of limiting distributions for these processes.…”
Section: Directionally Reinforced Random Walksmentioning
confidence: 99%