标题:
带常利率的时间间隔为相位的Gerber-Shiu折现罚金函数The Gerber-Shiu Discounted Penalty Function for the Risk Model with Phase-Type Inter Claim Times
作者:
肖菊霞
关键字:
时间间隔为相位分布, 常利率, 积分方程, 微分方程, VolterraPhase-Type Inter-Claim Times, Constant, Integral Function, Differential Equation, Volterra
期刊名称:
《Pure Mathematics》, Vol.4 No.4, 2014-07-31
摘要:
相位分布的研究在研究正半轴的其他分布中起着重要作用。考虑带常利率的时间间隔为相位分布的更新风险模型。首先推导出Gerber-Shiu期望折现罚金函数满足的积分微分方程,然后经过一系列的推导过程得到Volterra形式的矩阵积分方程,从而得到Gerber-Shiu期望折现罚金函数的一种解法。Research in the phase-type distribution has an important influence for the research of other dis-tributions on the positive real axis. It considers the risk model with the phase-type inter-claim times and for constant interest, it first derives the integral-differential equation satisfied by the Gerber-Shiu discounted penalty function. Then through a series of deriving, it obtains the volterra integral equation in a form of matrix. It gets a method of solving the Gerber-Shiu expected penalty function.