The evaluation of the likelihood function of the stochastic conditional duration model requires to compute an integral that has the dimension of the sample size. We apply the efficient importance sampling method for computing this integral. We compare EIS-based ML estimation with QML estimation based on the Kalman filter. We find that EIS-ML estimation is more precise statistically, at a cost of an acceptable loss of quickness of computations. We illustrate this with simulated and real data. We show also that the EIS-ML method is easy to apply to extensions of the SCD model.Stochastic conditional duration, importance sampling
Autoregressive Conditional Duration (ACD) models playa central role in modelling high frequency fina...
We first present a short review of Monte Carlo techniques for likelihood evaluation for state space ...
CITATION: Cameron, S. A.; Eggers, H. C. & Kroon, S. 2019. Stochastic gradient annealed importance sa...
The evaluation of the likelihood function of the stochastic conditional duration (SCD) model require...
This thesis organizes three contributions on the econometrics of duration in the context of high fre...
The paper describes a simple, generic and yet highly accurate Efficient Importance Sampling (EIS) Mo...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
This paper considers ML estimation of a diffusion process observed discretely. Since the exact logli...
The efficient importance sampling (EIS) method is a general principle for the nu-merical evaluation ...
The interest of this dissertation lays on the Likelihood Evaluation and Maximum Likelihood (ML) Para...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
This thesis analyzes an importance sampling method whose effectiveness relies in many cases onthe se...
This thesis focusses on econometric applications requiring multivariate numerical integration. Model...
We introduce a new efficient importance sampler for nonlinear non-Gaussian state space models. We pr...
The construction of an importance density for partially non-Gaussian state space models is crucial w...
Autoregressive Conditional Duration (ACD) models playa central role in modelling high frequency fina...
We first present a short review of Monte Carlo techniques for likelihood evaluation for state space ...
CITATION: Cameron, S. A.; Eggers, H. C. & Kroon, S. 2019. Stochastic gradient annealed importance sa...
The evaluation of the likelihood function of the stochastic conditional duration (SCD) model require...
This thesis organizes three contributions on the econometrics of duration in the context of high fre...
The paper describes a simple, generic and yet highly accurate Efficient Importance Sampling (EIS) Mo...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
This paper considers ML estimation of a diffusion process observed discretely. Since the exact logli...
The efficient importance sampling (EIS) method is a general principle for the nu-merical evaluation ...
The interest of this dissertation lays on the Likelihood Evaluation and Maximum Likelihood (ML) Para...
Maximum likelihood estimation (MLE) of stochastic differential equations (SDEs) is difficult because...
This thesis analyzes an importance sampling method whose effectiveness relies in many cases onthe se...
This thesis focusses on econometric applications requiring multivariate numerical integration. Model...
We introduce a new efficient importance sampler for nonlinear non-Gaussian state space models. We pr...
The construction of an importance density for partially non-Gaussian state space models is crucial w...
Autoregressive Conditional Duration (ACD) models playa central role in modelling high frequency fina...
We first present a short review of Monte Carlo techniques for likelihood evaluation for state space ...
CITATION: Cameron, S. A.; Eggers, H. C. & Kroon, S. 2019. Stochastic gradient annealed importance sa...