摘要
Black-Scholes期权定价方程是现代金融理论最伟大的成就之一,推动了全球金融市场的发展.本文以Merton提出的带有跳扩散过程的偏积分微分方程为研究对象,对空间微分算子使用有限差分方法离散.由于空间积分算子的非局部性质,为减少工作量,采用显式时间离散进而推导了二阶变步长隐显BDF方法,并通过数值例子验证了该方法的有效性.
Black-Scholes option pricing equation is one of the biggest achievements in modem financial theory.In this paper,we studied the partial integro-differential equation with jump-difiusion process proposed Merton.The discretization of spatial differential operators is by finite difference method.In view of the non-local property of the spatial integral operator,we use explicit time discretization for reducing the compute cost.We further derived the variable step-size IMEX-BDF2 method for solving Merton jump-difEusion model.Numerical example illustrates the effectiveness of the proposed method.
作者
方华
王晚生
FANG Hua;WANG Wansheng(School of Mathematics and Computational Science,Changsha University of Science and Technology,Changsha 410114,China)
出处
《湖南理工学院学报(自然科学版)》
CAS
2018年第1期1-6,25,共7页
Journal of Hunan Institute of Science and Technology(Natural Sciences)
基金
国家自然科学基金项目(11771060
11371074)