SIGN.test: Sign Test

View source: R/SIGN.test.R

SIGN.testR Documentation

Sign Test

Description

This function will test a hypothesis based on the sign test and reports linearly interpolated confidence intervals for one sample problems.

Usage

SIGN.test(
  x,
  y = NULL,
  md = 0,
  alternative = "two.sided",
  conf.level = 0.95,
  ...
)

Arguments

x

numeric vector; NAs and Infs are allowed but will be removed.

y

optional numeric vector; NAs and Infs are allowed but will be removed.

md

a single number representing the value of the population median specified by the null hypothesis

alternative

is a character string, one of "greater", "less", or "two.sided", or the initial letter of each, indicating the specification of the alternative hypothesis. For one-sample tests, alternative refers to the true median of the parent population in relation to the hypothesized value of the median.

conf.level

confidence level for the returned confidence interval, restricted to lie between zero and one

...

further arguments to be passed to or from methods

Details

Computes a “Dependent-samples Sign-Test” if both x and y are provided. If only x is provided, computes the “Sign-Test.”

Value

A list of class htest_S, containing the following components:

statistic

the S-statistic (the number of positive differences between the data and the hypothesized median), with names attribute “S”.

p.value

the p-value for the test

conf.int

is a confidence interval (vector of length 2) for the true median based on linear interpolation. The confidence level is recorded in the attribute conf.level. When the alternative is not "two.sided", the confidence interval will be half-infinite, to reflect the interpretation of a confidence interval as the set of all values k for which one would not reject the null hypothesis that the true mean or difference in means is k. Here infinity will be represented by Inf.

estimate

is avector of length 1, giving the sample median; this estimates the corresponding population parameter. Component estimate has a names attribute describing its elements.

null.value

is the value of the median specified by the null hypothesis. This equals the input argument md. Component null.value has a names attribute describing its elements.

alternative

records the value of the input argument alternative: "greater", "less", or "two.sided"

data.name

a character string (vector of length 1) containing the actual name of the input vector x

Confidence.Intervals

a 3 by 3 matrix containing the lower achieved confidence interval, the interpolated confidence interval, and the upper achived confidence interval

Null Hypothesis

For the one-sample sign-test, the null hypothesis is that the median of the population from which x is drawn is md. For the two-sample dependent case, the null hypothesis is that the median for the differences of the populations from which x and y are drawn is md. The alternative hypothesis indicates the direction of divergence of the population median for x from md (i.e., "greater", "less", "two.sided".)

Assumptions

The median test assumes the parent population is continuous.

Note

The reported confidence interval is based on linear interpolation. The lower and upper confidence levels are exact.

Author(s)

Alan T. Arnholt <arnholtat@appstate.edu>

References

  • Gibbons, J.D. and Chakraborti, S. 1992. Nonparametric Statistical Inference. Marcel Dekker Inc., New York.

  • Kitchens, L.J. 2003. Basic Statistics and Data Analysis. Duxbury.

  • Conover, W. J. 1980. Practical Nonparametric Statistics, 2nd ed. Wiley, New York.

  • Lehmann, E. L. 1975. Nonparametrics: Statistical Methods Based on Ranks. Holden and Day, San Francisco.

See Also

z.test, zsum.test, tsum.test

Examples

with(data = Phone, SIGN.test(call.time, md = 2.1))
# Computes two-sided sign-test for the null hypothesis
# that the population median is 2.1.  The alternative
# hypothesis is that the median is not 2.1.  An interpolated
# upper 95% upper bound for the population median will be computed. 


PASWR documentation built on May 15, 2022, 5:05 p.m.