Janicki, A.; Michna, Z.; Weron, A. Approximation of stochastic differential equations driven by \(\alpha\)-stable Lévy motion. (English) Zbl 0879.60059 Appl. Math. 24, No. 2, 149-168 (1996). Summary: We present a result on convergence of approximate solutions of stochastic differential equations involving integrals with respect to \(\alpha\)-stable Lévy motion. We prove an appropriate weak limit theorem, which does not follow from known results on stability properties of stochastic differential equations driven by semimartingales. It assures convergence in law in the Skorokhod topology of sequences of approximate solutions and justifies discrete time schemes applied in computer simulations. An example is included in order to demonstrate that stochastic differential equations with jumps are of interest in constructions of models for various problems arising in science and engineering, often providing better description of real life phenomena than their Gaussian counterparts. In order to demonstrate the usefulness of our approach, we present computer simulations of a continuous time \(\alpha\)-stable model of cumulative gain in the Duffie-Harrison option pricing framework. Cited in 7 Documents MSC: 60H10 Stochastic ordinary differential equations (aspects of stochastic analysis) 60J99 Markov processes 65C20 Probabilistic models, generic numerical methods in probability and statistics Keywords:stochastic differential equations with jumps; convergence of approximate solutions of stochastic differential equations; Skorokhod topology; computer simulations; Duffie-Harrison option pricing PDFBibTeX XMLCite \textit{A. Janicki} et al., Appl. Math. 24, No. 2, 149--168 (1996; Zbl 0879.60059) Full Text: DOI EuDML