马尔可夫短噪声风险模型:Gerber-Shiu函数的数值方法。

IF 1 4区 数学 Q3 STATISTICS & PROBABILITY
Simon Pojer, Stefan Thonhauser
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引用次数: 1

摘要

本文考虑了马尔可夫射击噪声环境下的折扣惩罚函数,也称为Gerber-Shiu函数。首先,我们利用分段确定性马尔可夫过程(PDMPs)的底层结构来证明这些惩罚函数可以求解某些偏积分微分方程(PIDEs)。由于这些方程不能精确求解,我们开发了一个数值方案,使我们能够确定这些函数的近似值。这些数值解可以用有限状态空间连续马尔可夫链的罚函数来辨识。最后,我们证明了相应的生成器在合适的函数集上的收敛性,证明了这些马尔可夫链对原始PDMP是弱收敛的。这使得数值逼近收敛于原始马尔可夫短噪声环境的折现惩罚函数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

The Markovian Shot-noise Risk Model: A Numerical Method for Gerber-Shiu Functions.

The Markovian Shot-noise Risk Model: A Numerical Method for Gerber-Shiu Functions.

The Markovian Shot-noise Risk Model: A Numerical Method for Gerber-Shiu Functions.

The Markovian Shot-noise Risk Model: A Numerical Method for Gerber-Shiu Functions.

In this paper, we consider discounted penalty functions, also called Gerber-Shiu functions, in a Markovian shot-noise environment. At first, we exploit the underlying structure of piecewise-deterministic Markov processes (PDMPs) to show that these penalty functions solve certain partial integro-differential equations (PIDEs). Since these equations cannot be solved exactly, we develop a numerical scheme that allows us to determine an approximation of such functions. These numerical solutions can be identified with penalty functions of continuous-time Markov chains with finite state space. Finally, we show the convergence of the corresponding generators over suitable sets of functions to prove that these Markov chains converge weakly against the original PDMP. That gives us that the numerical approximations converge to the discounted penalty functions of the original Markovian shot-noise environment.

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来源期刊
CiteScore
1.70
自引率
0.00%
发文量
58
审稿时长
6-12 weeks
期刊介绍: Methodology and Computing in Applied Probability will publish high quality research and review articles in the areas of applied probability that emphasize methodology and computing. Of special interest are articles in important areas of applications that include detailed case studies. Applied probability is a broad research area that is of interest to many scientists in diverse disciplines including: anthropology, biology, communication theory, economics, epidemiology, finance, linguistics, meteorology, operations research, psychology, quality control, reliability theory, sociology and statistics. The following alphabetical listing of topics of interest to the journal is not intended to be exclusive but to demonstrate the editorial policy of attracting papers which represent a broad range of interests: -Algorithms- Approximations- Asymptotic Approximations & Expansions- Combinatorial & Geometric Probability- Communication Networks- Extreme Value Theory- Finance- Image Analysis- Inequalities- Information Theory- Mathematical Physics- Molecular Biology- Monte Carlo Methods- Order Statistics- Queuing Theory- Reliability Theory- Stochastic Processes
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