Nonlinearities in the drift and diffusion coefficients influence temporal dependence in diffusion models. We study this link using three measures of temporal dependence: rho-mixing, beta-mixing and alpha-mixing. Stationary diffusions that are rho-mixing have mixing coefficients that decay exponentially to zero. When they fail to be rho-mixing, they are still beta-mixing and alpha-mixing; but coefficient decay is slower than exponential. For such processes we find transformations of the Markov states that have finite variances but infinite spectral densities at frequency zero. The resulting spectral densities behave like those of stochastic processes with long memory. Finally we show how state-dependent, Poisson sampling alters the temporal dependenc...
The long range dependence paradigm appears to be a suitable description of the data generating proce...
This paper analyses a class of nonlinear time series models exhibiting long memory. These processes ...
In this paper, we are interested in a diffusion process based on a gradient descent. The process is ...
Nonlinearities in the drift and diffusion coefficients influence temporal dependence in diffusion model...
Nonlinearities in the drift and diffusion coefficients influence temporal dependence in diffusion mo...
We consider nonlinear transformations of random walks driven by thick-tailed innovations that may ha...
Much time series data are recorded on economic and financial variables. Statistical modelling of suc...
Realized volatility is studied using nonlinear and highly persistent dynamics. In particular, a mode...
We consider nonlinear functions of random walks driven by thick-tailed innovations. Nonlinearity, no...
This note shows that regime switching nonlinear autoregressive models widely used in the time series...
In this paper we propose several statistics to measure serial dependence that are useful to characte...
An emerging literature in time series econometrics concerns the modeling of potentially nonlinear te...
In the first chapter; we consider nonlinear transformations of random walks driven by thick-tailed i...
We study the effects of an external periodic perturbation on a Poisson rate process, with special at...
The Effect of Memory on Functional Large Deviations of Infinite Moving Average Processe
The long range dependence paradigm appears to be a suitable description of the data generating proce...
This paper analyses a class of nonlinear time series models exhibiting long memory. These processes ...
In this paper, we are interested in a diffusion process based on a gradient descent. The process is ...
Nonlinearities in the drift and diffusion coefficients influence temporal dependence in diffusion model...
Nonlinearities in the drift and diffusion coefficients influence temporal dependence in diffusion mo...
We consider nonlinear transformations of random walks driven by thick-tailed innovations that may ha...
Much time series data are recorded on economic and financial variables. Statistical modelling of suc...
Realized volatility is studied using nonlinear and highly persistent dynamics. In particular, a mode...
We consider nonlinear functions of random walks driven by thick-tailed innovations. Nonlinearity, no...
This note shows that regime switching nonlinear autoregressive models widely used in the time series...
In this paper we propose several statistics to measure serial dependence that are useful to characte...
An emerging literature in time series econometrics concerns the modeling of potentially nonlinear te...
In the first chapter; we consider nonlinear transformations of random walks driven by thick-tailed i...
We study the effects of an external periodic perturbation on a Poisson rate process, with special at...
The Effect of Memory on Functional Large Deviations of Infinite Moving Average Processe
The long range dependence paradigm appears to be a suitable description of the data generating proce...
This paper analyses a class of nonlinear time series models exhibiting long memory. These processes ...
In this paper, we are interested in a diffusion process based on a gradient descent. The process is ...