Path stability of stochastic differential equationsdriven by time-changed Lévy noises

This paper studies path stabilities of the solution to stochastic differential equations (SDE) driven by time-changed Lévy noise. The conditions for the solution of time-changed SDE to be path stable and exponentially path stable are given. Moreover, we reveal the important role of the time drift in determining the path stability properties of the solution. Related examples are provided.

[1]  A. M. Lyapunov The general problem of the stability of motion , 1992 .

[2]  Erkan Nane,et al.  Stability of stochastic differential equation driven by time-changed Lévy noise , 2016, 1604.07382.

[3]  Agnieszka Wyłomańska,et al.  Subdynamics of financial data from fractional Fokker-Planck equation , 2009 .

[4]  D. Applebaum Lévy Processes and Stochastic Calculus: Preface , 2009 .

[5]  M. Meerschaert,et al.  Stochastic model for ultraslow diffusion , 2006 .

[6]  Kei Kobayashi,et al.  A strong and weak approximation scheme for stochastic differential equations driven by a time-changed Brownian motion , 2014 .

[7]  David Applebaum,et al.  Lévy Processes and Stochastic Calculus by David Applebaum , 2009 .

[8]  Stability of stochastic differential equations with respect to time-changed Brownian motions , 2016, 1602.08160.

[9]  Erkan Nane,et al.  Stability of the solution of stochastic differential equation driven by time-changed Lévy noise , 2017 .

[10]  Pricing European options and currency options by time changed mixed fractional Brownian motion with transaction costs , 2016 .

[11]  R. C. Merton,et al.  Option pricing when underlying stock returns are discontinuous , 1976 .

[12]  Kei Kobayashi Stochastic Calculus for a Time-Changed Semimartingale and the Associated Stochastic Differential Equations , 2009, 0906.5385.

[13]  M. Siakalli Stability properties of stochastic differential equations driven by Lévy noise , 2009 .

[14]  Mark M Meerschaert,et al.  INVERSE STABLE SUBORDINATORS. , 2013, Mathematical modelling of natural phenomena.

[15]  J. Jacod Calcul stochastique et problèmes de martingales , 1979 .

[16]  Sumit Kumar Jha,et al.  Exploring behaviors of stochastic differential equation models of biological systems using change of measures , 2012, BMC Bioinformatics.

[17]  Feller William,et al.  An Introduction To Probability Theory And Its Applications , 1950 .