We prove an enhanced limit theorem for additive functionals of a multi-dimensional Volterra process (yt)t≥0 in the rough path topology. As an application, we establish weak convergence as ε→0 of the solution of the random ordinary differential equation (ODE) ddtxεt=1ε√f(xεt,ytε) and show that its limit solves a rough differential equation driven by a Gaussian field with a drift coming from the Lévy area correction of the limiting rough driver. Furthermore, we prove that the stochastic flows of the random ODE converge to those of the Kunita type Itô SDE dxt=G(xt,dt), where G(x,t) is a semi-martingale with spatial parameters
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AbstractWe define and solve Volterra equations driven by a non-differentiable signal, by means of a ...
Consider a fast-slow system of ordinary differential equations of the form x˙=a(x,y)+ε−1b(x,y), y˙=ε...
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The thesis is devoted to an analysis of the heat equation with large random potentials in high dimen...
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Discrete approximations to solutions of stochastic differential equations are well-known to converge...
AbstractWe define and solve Volterra equations driven by a non-differentiable signal, by means of a ...
Consider a fast-slow system of ordinary differential equations of the form x˙=a(x,y)+ε−1b(x,y), y˙=ε...
We consider a system of differential equations in a fast long range dependent random environment and...
With recently developed tools, we prove a homogenisation theorem for a random ODE with short and lon...
Consider a family of random ordinary differential equations on a manifold driven by vector fields of...
We prove a functional limit theorem for vector-valued functionals of the fractional Ornstein-Uhlenbe...
This thesis examines various non-Markovian and fractional processes---rough volatility models, stoch...
We address propagation of chaos for large systems of rough differential equations associated with ra...
Two concrete examples show us that the convergence of a family of stochastic processes "as controls"...
In this paper we study the homogenization of a nonautonomous parabolic equation with a large random ...
AbstractA quantitative version of a well-known limit theorem for stochastic flows is establishing; o...
AbstractThis paper concerns the random fluctuation theory of a one dimensional elliptic equation wit...
The thesis is devoted to an analysis of the heat equation with large random potentials in high dimen...
The objective of this article is to analyse the statistical behaviour of a large number of weakly in...
Discrete approximations to solutions of stochastic differential equations are well-known to converge...
AbstractWe define and solve Volterra equations driven by a non-differentiable signal, by means of a ...
Consider a fast-slow system of ordinary differential equations of the form x˙=a(x,y)+ε−1b(x,y), y˙=ε...