 12113 Lasse Leskel , Mikko Stenlund
 A local limit theorem for a transient chaotic walk in a frozen environment
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Oct 4, 12

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Abstract. This paper studies particle propagation in a onedimensional inhomogeneous medium where the laws of motion are generated by chaotic and deterministic local maps. Assuming that the particle's initial location is random and uniformly distributed, this dynamical system can be reduced to a random walk in a onedimensional inhomogeneous environment with a forbidden direction. Our main result is a local limit theorem which explains in detail why, in the long run, the random walk's probability mass function does not converge to a Gaussian density, although the corresponding limiting distribution over a coarser diffusive space scale is Gaussian.
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