plot.qvalue: Plotting function for q-value object
In jdstorey/qvalue: Q-value estimation for false discovery rate control
plot.qvalue R Documentation
Plotting function for q-value object
Description
Graphical display of the q-value object
Usage
## S3 method for class 'qvalue'
plot(x, rng = c(0, 0.1), ...)
Arguments
x
A q-value object.
rng
Range of q-values to show. Optional
...
Additional arguments. Currently unused.
Details
The function plot allows one to view several plots:
The estimated \pi_0 versus the tuning parameter
\lambda.
The q-values versus the p-values.
The number of significant tests versus each q-value cutoff.
The number of expected false positives versus the number of
significant tests.
This function makes four plots. The first is a plot of the
estimate of \pi_0 versus its tuning parameter
\lambda. In most cases, as \lambda
gets larger, the bias of the estimate decreases, yet the variance
increases. Various methods exist for balancing this bias-variance
trade-off (Storey 2002, Storey & Tibshirani 2003, Storey, Taylor
& Siegmund 2004). Comparing your estimate of \pi_0 to this
plot allows one to guage its quality. The remaining three plots
show how many tests are called significant and how many false
positives to expect for each q-value cut-off. A thorough discussion of
these plots can be found in Storey & Tibshirani (2003).
Value
Nothing of interest.
Author(s)
John D. Storey, Andrew J. Bass
References
Storey JD. (2002) A direct approach to false discovery rates. Journal
of the Royal Statistical Society, Series B, 64: 479-498.
http://onlinelibrary.wiley.com/doi/10.1111/1467-9868.00346/abstract
Storey JD and Tibshirani R. (2003) Statistical significance for
genome-wide experiments. Proceedings of the National Academy of Sciences,
100: 9440-9445.
http://www.pnas.org/content/100/16/9440.full
Storey JD. (2003) The positive false discovery rate: A Bayesian
interpretation and the q-value. Annals of Statistics, 31: 2013-2035.
http://projecteuclid.org/DPubS/Repository/1.0/Disseminate?view=body&id=pdf_1&handle=euclid.aos/1074290335
Storey JD, Taylor JE, and Siegmund D. (2004) Strong control,
conservative point estimation, and simultaneous conservative
consistency of false discovery rates: A unified approach. Journal of
the Royal Statistical Society, Series B, 66: 187-205.
Storey JD. (2011) False discovery rates. In International Encyclopedia of Statistical Science.
http://genomine.org/papers/Storey_FDR_2011.pdf
http://www.springer.com/statistics/book/978-3-642-04897-5
See Also
qvalue, write.qvalue, summary.qvalue
Examples
# import data
data(hedenfalk)
p <- hedenfalk$p
qobj <- qvalue(p)
plot(qobj, rng=c(0.0, 0.3))
jdstorey/qvalue documentation built on Sept. 9, 2023, 1:50 p.m.
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| plot.qvalue | R Documentation |
Plotting function for q-value object
Description
Graphical display of the q-value object
Usage
## S3 method for class 'qvalue'
plot(x, rng = c(0, 0.1), ...)
Arguments
x |
A q-value object. |
rng |
Range of q-values to show. Optional |
... |
Additional arguments. Currently unused. |
Details
The function plot allows one to view several plots:
The estimated
\pi_0versus the tuning parameter\lambda.The q-values versus the p-values.
The number of significant tests versus each q-value cutoff.
The number of expected false positives versus the number of significant tests.
This function makes four plots. The first is a plot of the
estimate of \pi_0 versus its tuning parameter
\lambda. In most cases, as \lambda
gets larger, the bias of the estimate decreases, yet the variance
increases. Various methods exist for balancing this bias-variance
trade-off (Storey 2002, Storey & Tibshirani 2003, Storey, Taylor
& Siegmund 2004). Comparing your estimate of \pi_0 to this
plot allows one to guage its quality. The remaining three plots
show how many tests are called significant and how many false
positives to expect for each q-value cut-off. A thorough discussion of
these plots can be found in Storey & Tibshirani (2003).
Value
Nothing of interest.
Author(s)
John D. Storey, Andrew J. Bass
References
Storey JD. (2002) A direct approach to false discovery rates. Journal
of the Royal Statistical Society, Series B, 64: 479-498.
http://onlinelibrary.wiley.com/doi/10.1111/1467-9868.00346/abstract
Storey JD and Tibshirani R. (2003) Statistical significance for
genome-wide experiments. Proceedings of the National Academy of Sciences,
100: 9440-9445.
http://www.pnas.org/content/100/16/9440.full
Storey JD. (2003) The positive false discovery rate: A Bayesian
interpretation and the q-value. Annals of Statistics, 31: 2013-2035.
http://projecteuclid.org/DPubS/Repository/1.0/Disseminate?view=body&id=pdf_1&handle=euclid.aos/1074290335
Storey JD, Taylor JE, and Siegmund D. (2004) Strong control,
conservative point estimation, and simultaneous conservative
consistency of false discovery rates: A unified approach. Journal of
the Royal Statistical Society, Series B, 66: 187-205.
Storey JD. (2011) False discovery rates. In International Encyclopedia of Statistical Science.
http://genomine.org/papers/Storey_FDR_2011.pdf
http://www.springer.com/statistics/book/978-3-642-04897-5
See Also
qvalue, write.qvalue, summary.qvalue
Examples
# import data
data(hedenfalk)
p <- hedenfalk$p
qobj <- qvalue(p)
plot(qobj, rng=c(0.0, 0.3))
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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