Young and rough differential inclusions

Ismaël Bailleul; Antoine Brault; Laure Coutin

doi:10.4171/rmi/1236

JournalsrmiVol. 37, No. 4pp. 1489–1512

Young and rough differential inclusions

Ismaël Bailleul
Université de Rennes 1, France
Antoine Brault
Université de Paris, France, and Universidad de Chile, Santiago, Chile
Laure Coutin
Université Paul Sabatier, Toulouse, France

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Abstract

We define in this work a notion of Young differential inclusion

d z_{t} \in F (z_{t}) d x_{t},

for an $α$ -Hölder control $x$ , with $α > 1/2$ , and give an existence result for such a differential system. As a by-product of our proof, we show that a bounded, compact-valued, $γ$ -Hölder continuous set-valued map on the interval $[0, 1]$ has a selection with finite $p$ -variation, for $p > 1/ γ$ . We also give a notion of solution to the rough differential inclusion

d z_{t} \in F (z_{t}) d t + G (z_{t}) d X_{t},

for an $α$ -Hölder rough path $X$ with $α \in (1/3, 1/2]$ , a set-valued map $F$ and a single-valued one form $G$ . Then, we prove the existence of a solution to the inclusion when $F$ is bounded and lower semi-continuous with compact values, or upper semi-continuous with compact and convex values.

Cite this article

Ismaël Bailleul, Antoine Brault, Laure Coutin, Young and rough differential inclusions. Rev. Mat. Iberoam. 37 (2021), no. 4, pp. 1489–1512

DOI 10.4171/RMI/1236