The reconstruction of the Fokker-Planck equations from time series without prior information is still an open problem. Here, we propose a new method to robustly reconstruct different drift and diffusion terms at different sampling rates. Our method is based on the estimation of the transition probability densities for both of the time series and the stochastic differential equation. We approximate the two terms with the Chebyshev series. Without any prior information, our method can recover the orders and coefficients of the underlying polynomial drift and diffusion terms using the synthetic time series generated by four representative models at different sampling rates. The three important factors affecting the reconstructions are the opti...
With the aim of improving the reconstruction of stochastic evolution equations from empirical time-s...
M.Sc. (Mathematical Statistics)Stochastic Differential Equations (SDE’s) are commonly found in most ...
In this talk, we consider a class of multiscale stochastic system for which the evolution of the pro...
Abstract. A numerical technique for the reconstruction of diffusion processes (diffusions, in short)...
Many stochastic differential equations (SDEs) do not have readily available closed-form expressions ...
Maximum likelihood (ML) estimates of the param-eters of SDEs are consistent and asymptotically effic...
Abstract. We develop a recursive method for perturbative solutions of the Fokker-Planck equation wit...
Modeling and predicting the transient behavior of higher dimensional nonlinear dynamical systems sub...
The method of choice for integrating the time-dependent Fokker-Planck equation in high-dimension is ...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
This paper presents a method to transform the Fokker-Planck partial differential equation without di...
A method for deriving exact Fokker-Planck equations from stochastic master equations by expanding th...
We study the problem of drift estimation for two-scale continuous time series. We set ourselves in t...
: With the aim of improving the reconstruction of stochastic evolution equations from empirical time...
We present an approximate Maximum Likelihood estimator for univariate Ito stochastic differential eq...
With the aim of improving the reconstruction of stochastic evolution equations from empirical time-s...
M.Sc. (Mathematical Statistics)Stochastic Differential Equations (SDE’s) are commonly found in most ...
In this talk, we consider a class of multiscale stochastic system for which the evolution of the pro...
Abstract. A numerical technique for the reconstruction of diffusion processes (diffusions, in short)...
Many stochastic differential equations (SDEs) do not have readily available closed-form expressions ...
Maximum likelihood (ML) estimates of the param-eters of SDEs are consistent and asymptotically effic...
Abstract. We develop a recursive method for perturbative solutions of the Fokker-Planck equation wit...
Modeling and predicting the transient behavior of higher dimensional nonlinear dynamical systems sub...
The method of choice for integrating the time-dependent Fokker-Planck equation in high-dimension is ...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
This paper presents a method to transform the Fokker-Planck partial differential equation without di...
A method for deriving exact Fokker-Planck equations from stochastic master equations by expanding th...
We study the problem of drift estimation for two-scale continuous time series. We set ourselves in t...
: With the aim of improving the reconstruction of stochastic evolution equations from empirical time...
We present an approximate Maximum Likelihood estimator for univariate Ito stochastic differential eq...
With the aim of improving the reconstruction of stochastic evolution equations from empirical time-s...
M.Sc. (Mathematical Statistics)Stochastic Differential Equations (SDE’s) are commonly found in most ...
In this talk, we consider a class of multiscale stochastic system for which the evolution of the pro...