ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV
(2016). ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV. EKB Journal Management System, 7(1), 147-175. doi: 10.21608/jfca.2016.308380
. "ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV". EKB Journal Management System, 7, 1, 2016, 147-175. doi: 10.21608/jfca.2016.308380
(2016). 'ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV', EKB Journal Management System, 7(1), pp. 147-175. doi: 10.21608/jfca.2016.308380
ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV. EKB Journal Management System, 2016; 7(1): 147-175. doi: 10.21608/jfca.2016.308380

ON THE PROBABILISTIC APPROACH TO THE SOLUTION OF GENERALIZED FRACTIONAL DIFFERENTIAL EQUATIONS OF CAPUTO AND RIEMANN-LIOUVILLE TYPE M. E. HERN ANDEZ-HERNANDEZ, V. N. KOLOKOLTSOV

Journal of Fractional Calculus and Applications
Volume 7, Issue 1, 2016, Page 147-175  XML PDF (461.81 K)
Document Type: Regular research papers
DOI: 10.21608/jfca.2016.308380
View on SCiNiTO View on SCiNiTO
Abstract
This paper provides a probabilistic approach to solve linear equa tions involving Caputo and Riemann-Liouville type derivatives. Using the probabilistic interpretation of these operators as the generators of interrupted Feller processes, we obtain well-posedness results and explicit solutions (in terms of the transition densities of the underlying stochastic processes). The problems studied here include fractional linear differential equations, well analyzed in the literature, as well as their far reaching extensions.
Statistics
Article View: 7
PDF Download: 8