With the aim of improving the reconstruction of stochastic evolution equations from empirical time-series data, we derive a full representation of the generator of the Kramers-Moyal operator via a power-series expansion of the exponential operator. This expansion is necessary for deriving the different terms in a stochastic differential equation. With the full representation of this operator, we are able to separate finite-time corrections of the power-series expansion of arbitrary order into terms with and without derivatives of the Kramers-Moyal coefficients. We arrive at a closed-form solution expressed through conditional moments, which can be extracted directly from time-series data with a finite sampling intervals. We provide all fini...
This thesis is split in three parts, all of which obtain derivative estimates for the solution to th...
We present a novel approach to inference in conditionally Gaussian continuous time stochastic proces...
We introduce the bivariate jump-diffusion process, comprising two-dimensional diffusion and two-dime...
: With the aim of improving the reconstruction of stochastic evolution equations from empirical time...
We analyze the impact of the sampling interval on the estimation of Kramers-Moyal coefficients. We o...
kramersmoyal is a python library to extract the Kramers--Moyal coefficients from timeseries of any d...
To reliably estimate the dynamics of diffusive Markov processes, we combine statistically independen...
The reconstruction of the Fokker-Planck equations from time series without prior information is stil...
Kramers-Moyal coefficients provide a simple and easily visualized method with which to analyze nonli...
We introduce the bivariate jump-diffusion process, consisting of two-dimensional diffusion and two-d...
International audienceWe study inference on continuous-time processes from discrete data with a give...
Abstract. A numerical technique for the reconstruction of diffusion processes (diffusions, in short)...
"Natural processes evolve in continuous time but their observation is inevitably made at discrete ti...
A phenomenological interpolation model for the transition operator of a stationary Markov process is...
Many stochastic differential equations (SDEs) in the literature have a superlinearly growing nonline...
This thesis is split in three parts, all of which obtain derivative estimates for the solution to th...
We present a novel approach to inference in conditionally Gaussian continuous time stochastic proces...
We introduce the bivariate jump-diffusion process, comprising two-dimensional diffusion and two-dime...
: With the aim of improving the reconstruction of stochastic evolution equations from empirical time...
We analyze the impact of the sampling interval on the estimation of Kramers-Moyal coefficients. We o...
kramersmoyal is a python library to extract the Kramers--Moyal coefficients from timeseries of any d...
To reliably estimate the dynamics of diffusive Markov processes, we combine statistically independen...
The reconstruction of the Fokker-Planck equations from time series without prior information is stil...
Kramers-Moyal coefficients provide a simple and easily visualized method with which to analyze nonli...
We introduce the bivariate jump-diffusion process, consisting of two-dimensional diffusion and two-d...
International audienceWe study inference on continuous-time processes from discrete data with a give...
Abstract. A numerical technique for the reconstruction of diffusion processes (diffusions, in short)...
"Natural processes evolve in continuous time but their observation is inevitably made at discrete ti...
A phenomenological interpolation model for the transition operator of a stationary Markov process is...
Many stochastic differential equations (SDEs) in the literature have a superlinearly growing nonline...
This thesis is split in three parts, all of which obtain derivative estimates for the solution to th...
We present a novel approach to inference in conditionally Gaussian continuous time stochastic proces...
We introduce the bivariate jump-diffusion process, comprising two-dimensional diffusion and two-dime...