Concentration inequalities for stochastic differential equations of pure non-Poissonian jumps

Academic Article
Publication Date:
2020
abstract:
We provide concentration inequalities for solutions to stochastic differential equations of pure not-necessarily Poissonian jumps. Our proofs are based on transportation cost inequalities for square integrable functionals of point processes with stochastic intensity and elements of stochastic calculus with respect to semi-martingales. We apply the general results to solutions of stochastic differential equations driven by renewal and non-linear Hawkes point processes. (C) 2020 Elsevier B.V. All rights reserved.
Iris type:
01.01 Articolo in rivista
Keywords:
Concentration inequalities; Malliavin calculus; Point processes; Stochastic differential equations; Transportation cost inequalities
List of contributors:
Authors of the University:
Handle:
https://iris.cnr.it/handle/20.500.14243/380066
Published in:
STOCHASTIC PROCESSES AND THEIR APPLICATIONS
Journal