 On Stochastic Equations with Measurable Coefficients Driven by Symmetric Stable ProcessesV. P. Kurenok International Journal of Stochastic Analysis, 2012, vol. 2012, 1-17 Abstract: We consider a one-dimensional stochastic equation ð ‘‘ ð ‘‹ ð ‘¡ = ð ‘ ( ð ‘¡ , ð ‘‹ ð ‘¡ − ) ð ‘‘ ð ‘ ð ‘¡ + ð ‘Ž ( ð ‘¡ , ð ‘‹ ð ‘¡ ) ð ‘‘ ð ‘¡ , ð ‘¡ ≥ 0 , with respect to a symmetric stable process ð ‘ of index 0 < ð ›¼ ≤ 2 . It is shown that solving this equation is equivalent to solving of a 2-dimensional stochastic equation ð ‘‘ ð ¿ ð ‘¡ = ð µ ( ð ¿ ð ‘¡ − ) ð ‘‘ ð ‘Š ð ‘¡ with respect to the semimartingale ð ‘Š = ( ð ‘ , ð ‘¡ ) and corresponding matrix ð µ . In the case of 1 ≤ ð ›¼ < 2 we provide new sufficient conditions for the existence of solutions of both equations with measurable coefficients. The existence proofs are established using the method of Krylov's estimates for processes satisfying the 2-dimensional equation. On another hand, the Krylov's estimates are based on some analytical facts of independent interest that are also proved in the paper. Date: 2012 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jnijsa:258415 DOI: 10.1155/2012/258415 Access Statistics for this article More articles in International Journal of Stochastic Analysis from Hindawi |
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