Add to ORKGPerfect simulations are methods, which convert suitable Markov chain Monte Carlo (MCMC) algorithms into algorithms which return exact draws from the target distribution, instead of approximations based on long-time convergence to equilibrium. In recent years a lot of various perfect simulation algorithms were developed. This work provides a unified exposition of some perfect simulation algorithms with applications to spatial point processes, especially to the Strauss process and area-interaction process. Described algorithms and their properties are compared theoretically and also by a simulation study
AbstractWe present a perfect simulation algorithm for measures that are absolutely continuous with r...
This thesis is about probabilistic simulation techniques. Specifically we consider the exact or perf...
We provide an exact simulation algorithm that produces variables from truncated Gaussian distributio...
Simulation plays an important role in stochastic geometry and related fields, because all but the si...
This work presents a review of some of the schemes used to perfect sample from spatial processes
: Because so many random processes arising in stochastic geometry are quite intractable to analysis,...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
In this paper we investigate the application of perfect simulation, in particular Coupling from the ...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
We present a perfect simulation algorithm for measures that are absolutely continuous with respect t...
Markov Chain Monte Carlo method is used to sample from complicated multivariate distribution with no...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
AbstractWe present a perfect simulation algorithm for measures that are absolutely continuous with r...
This thesis is about probabilistic simulation techniques. Specifically we consider the exact or perf...
We provide an exact simulation algorithm that produces variables from truncated Gaussian distributio...
Simulation plays an important role in stochastic geometry and related fields, because all but the si...
This work presents a review of some of the schemes used to perfect sample from spatial processes
: Because so many random processes arising in stochastic geometry are quite intractable to analysis,...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
In this paper we investigate the application of perfect simulation, in particular Coupling from the ...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
We present a perfect simulation algorithm for measures that are absolutely continuous with respect t...
Markov Chain Monte Carlo method is used to sample from complicated multivariate distribution with no...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
The area-interaction process and the continuum random-cluster model are characterized in terms of ce...
AbstractWe present a perfect simulation algorithm for measures that are absolutely continuous with r...
This thesis is about probabilistic simulation techniques. Specifically we consider the exact or perf...
We provide an exact simulation algorithm that produces variables from truncated Gaussian distributio...