The Poisson Distribution depends on only one parameter, λ, and can be interpreted as an approximation to the binomial distribution when the parameter p is a small number.
•
A poisson-distributed random variable is usually used to describe the random number of events occuring over a certain time interval.
simulation | Computer simulation | Simulation video game | Tierra (computer simulation) | Thales Training & Simulation | stochastic process | social simulation | Mesohabitat Simulation Model | Dynamic stochastic general equilibrium | Advanced Simulation and Computing Program | Virtual Air Traffic Simulation Network (VATSIM) | Virtual Air Traffic Simulation Network | Vehicle simulation game | vehicle simulation game | TSS - Transport Simulation Systems | Task analysis environment modeling simulation | Stochastic screening | Stochastic process | Stochastic geometry | Stochastic electrodynamics | Stochastic context-free grammar | Simultaneous perturbation stochastic approximation | Simulation Open Framework Architecture | Simulation game | Simulation for Automatic Machinery | Simulation | Network traffic simulation | Journal of Artificial Societies and Social Simulation | Joint Theater Level Simulation | Crowd simulation |