We provide general conditions under which a class of discrete-time volatility models driven by the score of the conditional density converges in distribution to a stochastic differential equation as the interval between observations goes to zero. We show that the form of the diffusion limit depends on: (i) the link function, (ii) the conditional second moment of the score, (iii) the normalization of the score. Interestingly, the properties of the stochastic differential equation are strictly entangled with those of the discrete-time counterpart. Score-driven models with fat-tailed densities lead to continuous-time processes with finite volatility of volatility, as opposed to fat-tailed models with a GARCH update, for which the volatility of...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
We consider the symmetric Markovian random evolution X(t) performed by a particle that moves with co...
AbstractWe consider a system of stochastic equations which models the population dynamics of a prey–...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
AbstractWe consider the following hidden Markov chain problem: estimate the finite-dimensional param...
International audienceThis paper is devoted to the convergence analysis of stochastic approximation ...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We study the weak convergence of solutions of the Itˆo stochastic equation, whose coeffcients depen...
AbstractThe paper studies the rate of convergence of the weak Euler approximation for solutions to S...
Let $(X_t)$ be a reflected diffusion process in a bounded convex domain in $\mathbb R^d$, solving th...
We determine the rate of decay of the expectation Z(t) of some multiplicative functional related to ...
AbstractAssuming that {(Un,Vn)} is a sequence of càdlàg processes converging in distribution to (U,V...
Assuming that $(X_t)_{t\in\Z}$ is a vector valued time series with a common marginal distribution ad...
In this paper we present a result on convergence of approximate solutions of stochastic differential...
AbstractLet W=(Wi)i∈N be an infinite dimensional Brownian motion and (Xt)t≥0 a continuous adaptedn-d...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
We consider the symmetric Markovian random evolution X(t) performed by a particle that moves with co...
AbstractWe consider a system of stochastic equations which models the population dynamics of a prey–...
We provide general conditions under which a class of discrete-time volatility models driven by the s...
AbstractWe consider the following hidden Markov chain problem: estimate the finite-dimensional param...
International audienceThis paper is devoted to the convergence analysis of stochastic approximation ...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We study the weak convergence of solutions of the Itˆo stochastic equation, whose coeffcients depen...
AbstractThe paper studies the rate of convergence of the weak Euler approximation for solutions to S...
Let $(X_t)$ be a reflected diffusion process in a bounded convex domain in $\mathbb R^d$, solving th...
We determine the rate of decay of the expectation Z(t) of some multiplicative functional related to ...
AbstractAssuming that {(Un,Vn)} is a sequence of càdlàg processes converging in distribution to (U,V...
Assuming that $(X_t)_{t\in\Z}$ is a vector valued time series with a common marginal distribution ad...
In this paper we present a result on convergence of approximate solutions of stochastic differential...
AbstractLet W=(Wi)i∈N be an infinite dimensional Brownian motion and (Xt)t≥0 a continuous adaptedn-d...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
We consider the symmetric Markovian random evolution X(t) performed by a particle that moves with co...
AbstractWe consider a system of stochastic equations which models the population dynamics of a prey–...