Abstract
We consider a sequence of processes X_n(t)$ defined on half-line $0\leq t<\infty$. We give sufficient conditions for Large Deviation Principle (LDP) to hold in the space of continuous functions with metric $\rho(f,g)=\sup_{t\geq0} |f(t)−g(t)|/(1+t^{1+\kappa})$, $\kappa\geq0$. LDP is established for Random Walks, Diffusions, and CEV model of ruin, all defined on the half-line. LDP in this space is "more precise" than that with the usual metric of uniform convergence on compacts.
Citation
Fima Klebaner. Artem Logachev. Anatoli Mogulski. "Large deviations for processes on half-line." Electron. Commun. Probab. 20 1 - 14, 2015. https://doi.org/10.1214/ECP.v20-4130
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