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Large Deviations for a Random Walk in Random Environment
Let ω = (px)x∈Zbe an i.i.d. collection of (0, 1)-valued random variables. Given ω, let (Xn)n ≥ 0be the Markov chain on Z defined by X0= 0 and$X_{n + 1} = X_n + 1(\operatorname{resp}. X_n - 1)$with probability$p_{X_n}(\operatorname{resp}.1 - p_{X_n})$. It is shown that Xn/n satisfies a large deviatio...
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| Published in: | The Annals of probability 1994-07, Vol.22 (3), p.1381-1428 |
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| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that cite this one |
| Online Access: | Get full text |
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| Summary: | Let ω = (px)x∈Zbe an i.i.d. collection of (0, 1)-valued random variables. Given ω, let (Xn)n ≥ 0be the Markov chain on Z defined by X0= 0 and$X_{n + 1} = X_n + 1(\operatorname{resp}. X_n - 1)$with probability$p_{X_n}(\operatorname{resp}.1 - p_{X_n})$. It is shown that Xn/n satisfies a large deviation principle with a continuous rate function, that is,$\lim_{n\rightarrow\infty}\frac{1}{n}\log P_\omega(X_n = \lfloor\theta_nn\rfloor) = -I(\theta) \omega-\mathrm{a.s.}\text{for} \theta_n\rightarrow\in\lbrack -1, 1\rbrack.$First, we derive a representation of the rate function I in terms of a variational problem. Second, we solve the latter explicitly in terms of random continued fractions. This leads to a classification and qualitative description of the shape of I. In the recurrent case I is nonanalytic at θ = 0. In the transient case I is nonanalytic at θ = -θc, 0, θcfor some θc≥ 0, with linear pieces in between. |
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| ISSN: | 0091-1798 2168-894X |
| DOI: | 10.1214/aop/1176988607 |