stochContr: Stochastic contribution analysis of Monte Carlo...
In anspiess/propagate: Propagation of Uncertainty
Description
Usage
Arguments
Details
Value
Author(s)
Examples
Description
Conducts a "stochastic contribution analysis" by calculating the change in propagated uncertainty when each of the simulated variables is kept constant at its mean, i.e. the uncertainty is removed.
Usage
1
stochContr(prop, plot = TRUE)
Arguments
prop
a propagate object.
plot
logical. If TRUE, a boxplot with the original and mean-value propagated distribution.
Details
This function takes the Monte Carlo simulated data X_n from a propagate object (...$datSIM), sequentially substitutes each variable β_i by its mean \bar{β_i} and then re-evaluates the output distribution Y_n = f(β, X_n). Optional boxplots are displayed that compare the original Y_n\mathrm{(orig)} to those obtained from removing σ from each β_i. Finally, the relative contribution C_i for all β_i is calculated by C_i = σ(Y_n\mathrm{(orig)})-σ(Y_n), and divided by its sum so that ∑_{i=1}^n C_i = 1.
Value
The relative contribution C_i for all variables.
Author(s)
Andrej-Nikolai Spiess
Examples
1
2
3
4
5
6
7
a <- c(15, 1)
b <- c(100, 5)
c <- c(0.5, 0.02)
DAT <- cbind(a, b, c)
EXPR <- expression(a * b^sin(c))
RES <- propagate(EXPR, DAT, nsim = 100000)
stochContr(RES)
anspiess/propagate documentation built on May 14, 2019, 3:09 a.m.
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Description Usage Arguments Details Value Author(s) Examples
Description
Conducts a "stochastic contribution analysis" by calculating the change in propagated uncertainty when each of the simulated variables is kept constant at its mean, i.e. the uncertainty is removed.
Usage
1 | stochContr(prop, plot = TRUE)
|
Arguments
prop |
a |
plot |
logical. If |
Details
This function takes the Monte Carlo simulated data X_n from a propagate object (...$datSIM), sequentially substitutes each variable β_i by its mean \bar{β_i} and then re-evaluates the output distribution Y_n = f(β, X_n). Optional boxplots are displayed that compare the original Y_n\mathrm{(orig)} to those obtained from removing σ from each β_i. Finally, the relative contribution C_i for all β_i is calculated by C_i = σ(Y_n\mathrm{(orig)})-σ(Y_n), and divided by its sum so that ∑_{i=1}^n C_i = 1.
Value
The relative contribution C_i for all variables.
Author(s)
Andrej-Nikolai Spiess
Examples
1 2 3 4 5 6 7 | a <- c(15, 1)
b <- c(100, 5)
c <- c(0.5, 0.02)
DAT <- cbind(a, b, c)
EXPR <- expression(a * b^sin(c))
RES <- propagate(EXPR, DAT, nsim = 100000)
stochContr(RES)
|
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.
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