cf_reh_midp: Mid-p-value - based confidence bounds to the relative excess...
In EQUIVNONINF: Testing for Equivalence and Noninferiority
Description
Usage
Arguments
Details
Value
Author(s)
References
Examples
Description
Implementation of the interval estimation procedure described on
pp. 306-7 of Wellek S (2010) Testing statistical hypotheses of equivalence and noninferiority. Second edition.
Usage
1
cf_reh_midp(X1,X2,X3,alpha,SW,TOL,ITMAX)
Arguments
X1
count of homozygotes of the first kind [<-> genotype AA]
X2
count of heterozygotes [<-> genotype AB]
X3
count of homozygotes of the second kind [<-> genotype BB]
alpha
1 - confidence level
SW
width of the search grid for determining an interval covering the
parameter point at which the conditional distribution function takes
value α and 1-α, respectively
TOL
numerical tolerance to the deviation between the computed confidence limits
and their exact values
ITMAX
maximum number of interval-halving steps
Details
The mid-p algorithm serves as a device for reducing the conservatism
inherent in exact confidence estimation procedures for parameters of discrete
distributions.
Value
X1
count of homozygotes of the first kind [<-> genotype AA]
X2
count of heterozygotes [<-> genotype AB]
X3
count of homozygotes of the second kind [<-> genotype BB]
alpha
1 - confidence level
SW
width of the search grid for determining an interval covering the
parameter point at which the conditional distribution function takes
value α and 1-α, respectively
TOL
numerical tolerance to the deviation between the computed confidence limits
and their exact values
ITMAX
maximum number of interval-halving steps
C_l_midp
lower (1-α)-confidence bound to REH
based on conditional mid-p-values
C_r_midp
upper (1-α)-confidence bound to REH
based on conditional mid-p-values
Author(s)
Stefan Wellek <stefan.wellek@zi-mannheim.de>
Peter Ziegler <peter.ziegler@zi-mannheim.de>
References
Agresti A: Categorical data Analysis (2nd edn). Hoboken, NJ:
Wiley, Inc., 2002, Section 1.4.5.
Wellek S, Goddard KAB, Ziegler A: A confidence-limit-based approach
to the assessment of Hardy-Weinberg equilibrium.
Biometrical Journal 52 (2010), 253-270.
Wellek S: Testing statistical hypotheses of equivalence and
noninferiority. Second edition. Boca Raton:
Chapman & Hall/CRC Press, 2010, Par. 9.4.3.
Examples
1
2
cf_reh_midp(137,34,8,.05,.1,1E-4,25)
EQUIVNONINF documentation built on July 12, 2021, 5:08 p.m.
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Description Usage Arguments Details Value Author(s) References Examples
Description
Implementation of the interval estimation procedure described on pp. 306-7 of Wellek S (2010) Testing statistical hypotheses of equivalence and noninferiority. Second edition.
Usage
1 | cf_reh_midp(X1,X2,X3,alpha,SW,TOL,ITMAX)
|
Arguments
X1 |
count of homozygotes of the first kind [<-> genotype AA] |
X2 |
count of heterozygotes [<-> genotype AB] |
X3 |
count of homozygotes of the second kind [<-> genotype BB] |
alpha |
1 - confidence level |
SW |
width of the search grid for determining an interval covering the parameter point at which the conditional distribution function takes value α and 1-α, respectively |
TOL |
numerical tolerance to the deviation between the computed confidence limits and their exact values |
ITMAX |
maximum number of interval-halving steps |
Details
The mid-p algorithm serves as a device for reducing the conservatism inherent in exact confidence estimation procedures for parameters of discrete distributions.
Value
X1 |
count of homozygotes of the first kind [<-> genotype AA] |
X2 |
count of heterozygotes [<-> genotype AB] |
X3 |
count of homozygotes of the second kind [<-> genotype BB] |
alpha |
1 - confidence level |
SW |
width of the search grid for determining an interval covering the parameter point at which the conditional distribution function takes value α and 1-α, respectively |
TOL |
numerical tolerance to the deviation between the computed confidence limits and their exact values |
ITMAX |
maximum number of interval-halving steps |
C_l_midp |
lower (1-α)-confidence bound to REH based on conditional mid-p-values |
C_r_midp |
upper (1-α)-confidence bound to REH based on conditional mid-p-values |
Author(s)
Stefan Wellek <stefan.wellek@zi-mannheim.de>
Peter Ziegler <peter.ziegler@zi-mannheim.de>
References
Agresti A: Categorical data Analysis (2nd edn). Hoboken, NJ: Wiley, Inc., 2002, Section 1.4.5.
Wellek S, Goddard KAB, Ziegler A: A confidence-limit-based approach to the assessment of Hardy-Weinberg equilibrium. Biometrical Journal 52 (2010), 253-270.
Wellek S: Testing statistical hypotheses of equivalence and noninferiority. Second edition. Boca Raton: Chapman & Hall/CRC Press, 2010, Par. 9.4.3.
Examples
1 2 |
cf_reh_midp(137,34,8,.05,.1,1E-4,25)
|
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