This package contains various functions to be used for simulation education, including: simple Monte Carlo simulation functions; queueing simulation functions with optional animation; variate generation functions capable of producing independent streams and antithetic variates; separate functions for visualizing/animating (a) event-driven simulation details of a single-server queue model, (b) a Lehmer random-number generator, (c) random variate generation via acceptance-rejection, (d) generation of a non-homogeneous Poisson process via thinning, and (e) random variate generation for various discrete and continuous distributions; and functions to compute time-persistent statistics. The package also contains two queueing data sets (one fabricated, one real-world) to facilitate input modeling.
This is an example showing use of the ssq
function in our package to simulate a simple M/M/1 queue, passing in a custom exponential interarrival function defined using our vexp
variate generator, and then plotting the number in the system across time, with superimposed time-averaged statistics computed using meanTPS
and sdTPS
:
## ssq example code
library(simEd)
myArrFcn <- function() { vexp(1, rate = 1 / 0.95, stream = 1) }
output <- ssq(maxArrivals = 100, seed = 8675309, interarrivalFcn = myArrFcn,
saveNumInSystem = TRUE, showOutput = FALSE)
avg <- meanTPS(output$numInSystemT, output$numInSystemN)
sd <- sdTPS(output$numInSystemT, output$numInSystemN)
plot(output$numInSystemT, output$numInSystemN, type = "s", main = "M/M/1 Queue",
bty = "l", las = 1, xlab = "time", ylab = "number in system")
abline(h = avg, lwd = 2, col = "red")
abline(h = c(avg - sd, avg + sd), lwd = 2, lty = "dotted", col = "red")
Install the current version of simEd
from CRAN using install.packages("simEd")
.
Note that the simEd
package depends on Josef Leydold’s rstream
package, a wrapper of Pierre L’Ecuyer’s “mrg32k3a” random number generator, to provide independent streams of uniform(0,1) random numbers. The simEd
package also depends on the shape
package, used in producing animations. If either of the rstream
or shape
package is not already installed, the previous step will install them automatically.
The goal of this package is to facilitate use of R for an introductory course in discrete-event simulation.
This package contains animation functions for visualizing:
ssqvis
;lehmer
;accrej
;thinning
.This package contains variate generators capable of independent streams (based on Josef Leydold’s rstream
package) and antithetic variates for four discrete and eleven continuous distributions:
vbinom
, vgeom
, vnbinom
, vpois
,vbeta
, vcauchy
, vchisq
, vexp
, vgamma
, vlnorm
, vlogis
, vnorm
, vt
, vunif
, vweibull
All of the variate generators use inversion, and are therefore monotone and synchronized.
The package contains functions to visualize variate generation for the same four discrete and eleven continuous distributions:
ibinom
, igeom
, inbinom
, ipois
,ibeta
, icauchy
, ichisq
, iexp
, igamma
, ilnorm
, ilogis
, inorm
, it
, iunif
, iweibull
The package contains functions that implement Monte Carlo simulation approaches for estimating probabilities in two different dice games:
galileo
craps
The package also contains functions that are event-driven simulation implementations of a single-server single-queue system and of a multiple-server single-queue system:
ssq
msq
Both queueing functions are extensible in allowing the user to provide custom arrival and service process functions. Both functions provide animation.
The package contains four functions primarily for visualizing simulation concepts:
ssqvis
lehmer
accrej
thinning
The package contains three functions for computing time-persistent statistics:
meanTPS
sdTPS
quantileTPS
The package also masks two functions from the stats
package:
set.seed
, which explicitly calls the stats
version in addition to setting up seeds for the independent streams in the package;sample
, which provides capability to use independent streams and antithetic variates.Finally, the package provides two queueing data sets to facilitate input modeling:
queueTrace
, which contains 1000 arrival times and 1000 service times (all fabricated) for a single-server queueing system;tylersGrill
, which contains 1434 arrival times and 110 (sampled) service times corresponding to actual data collected during one business day at Tyler’s Grill at the University of Richmond.