Nothing
R/plotPriors.R
In GRENITS: Gene Regulatory Network Inference Using Time Series
Defines functions
.plotPriorsNonLinear
.plotPriorsErrorStudent
.plotPriorsErrorGauss
.plotPriorsLinear
plotPriors
Documented in
plotPriors
## plot priors
## Analyse mcmc output
plotPriors <- function(parameter.vec)
{
old.par <- par(no.readonly = TRUE)
param.type <- .paramVecType(parameter.vec)
if(param.type == "Linear_Param")
{
.plotPriorsLinear(parameter.vec)
}
# Dodgy work around
if(param.type == "nonLinear_Param")
{
.plotPriorsNonLinear(parameter.vec)
}
if(param.type == "RepsStudent_Param")
{
.plotPriorsErrorStudent(parameter.vec)
}
# Dodgy work around
if(param.type == "RepsGauss_Param")
{
.plotPriorsErrorGauss(parameter.vec)
}
par(old.par)
}
.plotPriorsLinear <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[1:3], main = "Run parameters")
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot B prior
x.vec <- seq(-3*parameter.vec[9], 3*parameter.vec[9], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[9]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsErrorGauss <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[c(1:3)], main = "Run parameters") #, 12
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "LambdaExp", ylab = "Probability density", main = "Prior distribution for \nPrecision of Data Replicates")
# Plot mu prior
x.vec <- seq(-3*parameter.vec[11], 3*parameter.vec[11], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[11]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsErrorStudent <- function(parameter.vec)
{
par(mfrow=c(3,3))
# Plot sample, burnin and thin
barplot(parameter.vec[c(1:3)], main = "Run parameters") #, 14
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "LambdaExp", ylab = "Probability density", main = "Prior distribution for \nPrecision of Data Replicates")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[11]/(parameter.vec[12])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[11], parameter.vec[12]),
x = x.vec, type = "l", col = "red",
xlab = "Deg Freedom", ylab = "Probability density",
main = "Prior distribution for \nDegrees of Freedom")
# Plot mu prior
x.vec <- seq(-3*parameter.vec[13], 3*parameter.vec[13], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[13]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsNonLinear <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[1:3], main = "Run parameters")
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot tau prior
xy_vals <- .Fpareto(parameter.vec[12], parameter.vec[6], num.points=10000)
plot(y = xy_vals$y,
x = xy_vals$x, type = "l", col = "red",
xlab = "Tau", ylab = "Probability density", main = "Prior distribution for \nNonLinearity parameter")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution \nPrecision")
# Plot Mu prior
x.vec <- seq(-3*parameter.vec[11], 3*parameter.vec[11], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[9]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
# Plot B1 and B2 prior
sd.aux <- 1/sqrt(parameter.vec[7])
x.vec <- seq(-3*sd.aux, 3*sd.aux, length.out = 1000)
plot(y = dnorm(x.vec, 0, sd.aux),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nTwo Spline Coefficients")
}
Try the GRENITS package in your browser
Any scripts or data that you put into this service are public.
GRENITS documentation built on Nov. 8, 2020, 6:47 p.m.
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
Defines functions .plotPriorsNonLinear .plotPriorsErrorStudent .plotPriorsErrorGauss .plotPriorsLinear plotPriors
Documented in plotPriors
## plot priors
## Analyse mcmc output
plotPriors <- function(parameter.vec)
{
old.par <- par(no.readonly = TRUE)
param.type <- .paramVecType(parameter.vec)
if(param.type == "Linear_Param")
{
.plotPriorsLinear(parameter.vec)
}
# Dodgy work around
if(param.type == "nonLinear_Param")
{
.plotPriorsNonLinear(parameter.vec)
}
if(param.type == "RepsStudent_Param")
{
.plotPriorsErrorStudent(parameter.vec)
}
# Dodgy work around
if(param.type == "RepsGauss_Param")
{
.plotPriorsErrorGauss(parameter.vec)
}
par(old.par)
}
.plotPriorsLinear <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[1:3], main = "Run parameters")
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot B prior
x.vec <- seq(-3*parameter.vec[9], 3*parameter.vec[9], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[9]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsErrorGauss <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[c(1:3)], main = "Run parameters") #, 12
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "LambdaExp", ylab = "Probability density", main = "Prior distribution for \nPrecision of Data Replicates")
# Plot mu prior
x.vec <- seq(-3*parameter.vec[11], 3*parameter.vec[11], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[11]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsErrorStudent <- function(parameter.vec)
{
par(mfrow=c(3,3))
# Plot sample, burnin and thin
barplot(parameter.vec[c(1:3)], main = "Run parameters") #, 14
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot B prior
x.vec <- seq(-3*parameter.vec[6], 3*parameter.vec[6], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[6]),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nCoefficients")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[7]/(parameter.vec[8])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[7], parameter.vec[8]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution for \nPrecision")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "LambdaExp", ylab = "Probability density", main = "Prior distribution for \nPrecision of Data Replicates")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[11]/(parameter.vec[12])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[11], parameter.vec[12]),
x = x.vec, type = "l", col = "red",
xlab = "Deg Freedom", ylab = "Probability density",
main = "Prior distribution for \nDegrees of Freedom")
# Plot mu prior
x.vec <- seq(-3*parameter.vec[13], 3*parameter.vec[13], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[13]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
}
.plotPriorsNonLinear <- function(parameter.vec)
{
par(mfrow=c(3,2))
# Plot sample, burnin and thin
barplot(parameter.vec[1:3], main = "Run parameters")
# Plot rho prior
x.vec <- 0.001*(0:1000)
plot(y = dbeta(x.vec, parameter.vec[4], parameter.vec[5]),
x = x.vec, type = "l", col = "red",
xlab = "Rho", ylab = "Probability density", main = "Prior distribution for \nRho")
# Plot tau prior
xy_vals <- .Fpareto(parameter.vec[12], parameter.vec[6], num.points=10000)
plot(y = xy_vals$y,
x = xy_vals$x, type = "l", col = "red",
xlab = "Tau", ylab = "Probability density", main = "Prior distribution for \nNonLinearity parameter")
# Plot lambda prior
sd.aux <- sqrt(parameter.vec[9]/(parameter.vec[10])^2)
x.vec <- seq(0, 5*sd.aux, length.out = 1000)
plot(y = dgamma(x.vec, parameter.vec[9], parameter.vec[10]),
x = x.vec, type = "l", col = "red",
xlab = "Lambda", ylab = "Probability density", main = "Prior distribution \nPrecision")
# Plot Mu prior
x.vec <- seq(-3*parameter.vec[11], 3*parameter.vec[11], length.out = 1000)
plot(y = dnorm(x.vec, 0, parameter.vec[9]),
x = x.vec, type = "l", col = "red",
xlab = "Mu", ylab = "Probability density", main = "Prior distribution for \nIntercept")
# Plot B1 and B2 prior
sd.aux <- 1/sqrt(parameter.vec[7])
x.vec <- seq(-3*sd.aux, 3*sd.aux, length.out = 1000)
plot(y = dnorm(x.vec, 0, sd.aux),
x = x.vec, type = "l", col = "red",
xlab = "B", ylab = "Probability density", main = "Prior distribution for \nTwo Spline Coefficients")
}
Try the GRENITS package in your browser
Any scripts or data that you put into this service are public.
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
Embedding an R snippet on your website
Add the following code to your website.
For more information on customizing the embed code, read Embedding Snippets.