Picard Iterations for Diffusions on Symmetric Matrices

被引:0
作者
Carlos G. Pacheco
机构
[1] CINVESTAV-IPN,Departamento de Matematicas
来源
Journal of Theoretical Probability | 2016年 / 29卷
关键词
Matrix-valued diffusions; Lipschitz conditions; Picard iterations; 60J60; 58J65;
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摘要
Matrix-valued stochastic processes have been of significant importance in areas such as physics, engineering and mathematical finance. One of the first models studied has been the so-called Wishart process, which is described as the solution of a stochastic differential equation in the space of matrices. In this paper, we analyze natural extensions of this model and prove the existence and uniqueness of the solution. We do this by carrying out a Picard iteration technique in the space of symmetric matrices. This approach takes into account the operator character of the matrices, which helps to corroborate how the Lipchitz conditions also arise naturally in this context.
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页码:1444 / 1457
页数:13
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