Convergence of delay equations driven by a Holder continuous function of order 1/3 <beta< 1/2
Abstract
In this article we show that, when the delay approaches zero, the solution of multidimensional delay differential equations driven by a Holder continuous function of order 1/3<β<1/2 converges with the supremum norm to the solution for the equation without delay. Finally we discuss the applications to stochastic differential equations.
Citation
Besalú, M., Binotto, G., & Rovira, C. (2020). Convergence of delay equations driven by a Holder continuous function of order 1/3<β<1/2. Electronic Journal of Differential Equations, 2020(65), pp. 1-27.Rights License
This work is licensed under a Creative Commons Attribution 4.0 International License.
