Title of article
Random times with given survival probability and their -martingale decomposition formula
Author/Authors
Jeanblanc، نويسنده , , Monique and Song، نويسنده , , Shiqi، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
22
From page
1389
To page
1410
Abstract
Given a filtered probability space ( Ω , F = ( F t ) t ≥ 0 , P ) , an F -adapted continuous increasing process Λ and a positive ( P , F ) local martingale N such that Z t : = N t e − Λ t satisfies Z t ≤ 1 , t ≥ 0 , we construct probability measures Q and a random time τ on an extension of ( Ω , F , P ) , such that the survival probability of τ , i.e., Q [ τ > t | F t ] is equal to Z t for t ≥ 0 . We show that there exist several solutions and that an increasing family of martingales, combined with a stochastic differential equation, constitutes a natural way to construct these solutions. Our extended space will be equipped with the enlarged filtration G = ( G t ) t ≥ 0 where G t is the σ -field ∩ s > t ( F s ∨ σ ( τ ∧ s ) ) completed with the Q -negligible sets. We show that all ( P , F ) martingales remain G -semimartingales and we give an explicit semimartingale decomposition formula. Finally, we show how this decomposition formula is intimately linked with the stochastic differential equation introduced before.
Keywords
Progressive enlargement of filtration , Semimartingale decomposition , credit risk , Multiplicative decomposition
Journal title
Stochastic Processes and their Applications
Serial Year
2011
Journal title
Stochastic Processes and their Applications
Record number
1578414
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