Approximate Solutions of Hybrid Stochastic Pantograph Equations with Levy Jumps

Approximate Solutions of Hybrid Stochastic Pantograph Equations with Levy Jumps

We investigate a class of stochastic pantograph differential equations with Markovian switching and Levy jumps. We prove that the approximate solutions converge to the true solutions in L2 sense as well as in probability under local Lipschitz condition and generalize the results obtained by Fan et a...

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Veröffentlicht in:Abstract and Applied Analysis 2013-01, Vol.2013 (2013), p.409-423-944
Hauptverfasser: Mao, Wei, Mao, Xuerong
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Approximation
Approximation theory
Delay equations
Differential equations
Lipschitz condition
Markov analysis
Markov processes
Mathematical analysis
Mathematical research
Methods
Pantographs
Stochastic differential equations
Stochasticity
Studies
Switching
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Beschreibung
Zusammenfassung:We investigate a class of stochastic pantograph differential equations with Markovian switching and Levy jumps. We prove that the approximate solutions converge to the true solutions in L2 sense as well as in probability under local Lipschitz condition and generalize the results obtained by Fan et al. (2007), Milošević and Jovanović (2011), and Marion et al. (2002) to cover a class of more general stochastic pantograph differential equations with jumps. Finally, an illustrative example is given to demonstrate our established theory.
ISSN:1085-3375
1687-0409
DOI:10.1155/2013/718627