|Title||Simulation of high-resolution precipitable water data by a stochastic model with a random trigger|
|Publication Type||Journal Article|
|Year of Publication||2016|
|Authors||Leung K, Velado M, Subramanian A, Zhang GJ, Somerville RCJ, Shen SSP|
|Journal||Advances in Data Science and Adaptive Analysis|
|Keywords||Brownian motion; precipitable water; random precipitation trigger; stochastic differential equation model; tropical warm pool — international cloud experiment|
We use a stochastic differential equation (SDE) model with a random precipitation trigger for mass balance to simulate the 20 s temporal resolution column precipitable water vapor (PWV) data during the tropical warm pool international cloud experiment (TWP-ICE) period of January 20 to February 15, 2006 at Darwin, Australia. The trigger is determined by an exponential cumulative distribution function, the time step size in the SDE simulation, and a random precipitation indicator uniformly distributed over [0, 1]. Compared with the observed data, the simulations have similar means, extremes, skewness, kurtosis, and overall shapes of probability distribution, and are temporally well synchronized for increasing and decreasing, but have about 20% lower standard deviation. Based on a 1000-day run, the correlations between the model data and the observations in TWP-ICE period were computed in a moving time window of 25 days and show quasi-periodic variations between (−0.675, 0.697). This shows that the results are robust for the stochastic model simulation of the observed PWV data, whose fractal dimension is 1.9, while the dimension of the simulated data is also about 1.9. This agreement and numerous sensitivity experiments form a test on the feasibility of using an SDE model to simulate precipitation processes in more complex climate models.