Multidimensional nonlinear boundary crossing problems
- 2014-06-24 (Tue.), 11:00 AM
- Recreation Hall, 2F, Institute of Statistical Science
- The reception will be held at 10:40 at the lounge on the second floor of the Institute of Statistical Science Building
- Mr. Chu-Lan Kao
- Graduate Institute of Statistics, National Central University
Abstract
In this paper, we study the first passage time of a multidimensional simple random walk crosses a certain type of nonlinear boundary. Under some regularity conditions, we derive asymptotic expansions for the ruin probability and the expected value. The evaluation of the expected value is through an innovative device that first rewrite the problem as an one dimensional Markov random walk crossing a linear boundary, and then approximate this Markov random walk by a sequence of uniformly ergodic Markov random walks. For this purpose, we also study renewal theory for a sequence of?Markov random walks. Numerical simulations are given for illustration.?
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