kendallNA: Kendall's coefficient of concordance W - generalized for...
In irrNA: Coefficients of Interrater Reliability – Generalized for Randomly Incomplete Datasets
kendallNA R Documentation
Kendall's coefficient of concordance W – generalized for randomly incomplete datasets
Description
This function computes Kendall's coefficient of concordance W that is an index of
interrater reliability for ordinal ratings. This function also works on incomplete datasets without
any imputation of missing values or (row- or cloumn-wise) omissions of data.
Usage
kendallNA(X)
Arguments
X
n*m matrix or dataframe; n objects (rows), k raters (columns)
Details
This function is able to calculate W, also on randomly incomplete (i.e. unbalanced)
data sets. Therefor it uses the mean Spearman's ρ of all pairwise comparisons, see Kendall
(1962):
W = [1 + mean ρ_S * (k-1)] / k
where k is the mean number of (pairwise) ratings per object and mean ρ_S is calculated
weighted, according to Taylor (1987), since the pairwise ρ_S are possibly based on a
different number of ratings, what must be reflected in weights.
Thus, an imputation of missing values or (row- or cloumn-wise) omissions of data are obsolete. In
case of complete datasets, it yields the same results as usual implementations of Kendall's W,
except for tied ranks. In case of tied ranks, the (pairwise) correction of ρ_S is used,
which (already with complete datasets) results in slightly different values than the tie correction
explicitly specified for W.
More details are given in Brueckl (2011).
Value
amrho
mean Spearman's ρ
amk
mean number of (pairwise) ratings per object
W
Kendall's coefficient of concordance among raters
chisqu
value of the χ-squared test statistic
df
degrees of freedom
p
one-tailed type I error probability (statistical significance)
Author(s)
Markus Brueckl
References
Brueckl, M. (2011). Statistische Verfahren zur Ermittlung der Urteileruebereinstimmung.
in: Altersbedingte Veraenderungen der Stimme und Sprechweise von Frauen, Berlin: Logos, 88–103.
Kendall, M.G. (1962). Rank correlation methods (3rd ed.). London: Griffin.
Taylor, J.M.G. (1987). Kendall's and Spearman's correlation coefficients in the
presence of a blocking variable. Biometrics, 43, 409–416.
See Also
iccNA, kendall
Examples
# Example 1:
data(ConsistNA)
# ConsistNA exhibits missing values and a perfect concordance
# between raters:
ConsistNA
# Common W-algorithms fail, since each row as well as each
# column of ConsistNA exhibits unfilled cells and these missing
# data are omitted column-wise or row-wise (please install and
# load the irr package):
#kendall(ConsistNA)
# But the generalization of Kendall's W implemeted in irrNA
# is able to assess the perfect concordance, assuming that
# the data were at least ordinally scaled and not tied, e.g.
# that each rater really ranked the objects that he rated
# without giving equal ranks to two or more objects.
kendallNA(ConsistNA)
#
# Example 2:
data(IndepNA)
# IndepNA exhibits missing values and zero variance between
# the raters (just as well as between the objects):
IndepNA
# Common W-algorithms fail:
#kendall(IndepNA)
# kendallNA includes all (rater-pairwise) available data in
# its calculation (e.g. only Objects 1--4 when Rater1 and
# Rater2 are correlated):
kendallNA(IndepNA)
#
# Example 3:
data(IndepW)
# IndepW exhibits missing values and a mean Spearman's rho,
# that equals zero:
IndepW
# Again, common W-algorithms fail,
#kendall(IndepW)
# while kendallNA includes all (rater-pairwise) available
# data:
kendallNA(IndepW)
irrNA documentation built on April 5, 2022, 1:12 a.m.
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| kendallNA | R Documentation |
Kendall's coefficient of concordance W – generalized for randomly incomplete datasets
Description
This function computes Kendall's coefficient of concordance W that is an index of interrater reliability for ordinal ratings. This function also works on incomplete datasets without any imputation of missing values or (row- or cloumn-wise) omissions of data.
Usage
kendallNA(X)
Arguments
X |
n*m matrix or dataframe; n objects (rows), k raters (columns) |
Details
This function is able to calculate W, also on randomly incomplete (i.e. unbalanced) data sets. Therefor it uses the mean Spearman's ρ of all pairwise comparisons, see Kendall (1962):
W = [1 + mean ρ_S * (k-1)] / k
where k is the mean number of (pairwise) ratings per object and mean ρ_S is calculated
weighted, according to Taylor (1987), since the pairwise ρ_S are possibly based on a
different number of ratings, what must be reflected in weights.
Thus, an imputation of missing values or (row- or cloumn-wise) omissions of data are obsolete. In
case of complete datasets, it yields the same results as usual implementations of Kendall's W,
except for tied ranks. In case of tied ranks, the (pairwise) correction of ρ_S is used,
which (already with complete datasets) results in slightly different values than the tie correction
explicitly specified for W.
More details are given in Brueckl (2011).
Value
amrho |
mean Spearman's ρ |
amk |
mean number of (pairwise) ratings per object |
W |
Kendall's coefficient of concordance among raters |
chisqu |
value of the χ-squared test statistic |
df |
degrees of freedom |
p |
one-tailed type I error probability (statistical significance) |
Author(s)
Markus Brueckl
References
Brueckl, M. (2011). Statistische Verfahren zur Ermittlung der Urteileruebereinstimmung. in: Altersbedingte Veraenderungen der Stimme und Sprechweise von Frauen, Berlin: Logos, 88–103.
Kendall, M.G. (1962). Rank correlation methods (3rd ed.). London: Griffin.
Taylor, J.M.G. (1987). Kendall's and Spearman's correlation coefficients in the presence of a blocking variable. Biometrics, 43, 409–416.
See Also
iccNA, kendall
Examples
# Example 1: data(ConsistNA) # ConsistNA exhibits missing values and a perfect concordance # between raters: ConsistNA # Common W-algorithms fail, since each row as well as each # column of ConsistNA exhibits unfilled cells and these missing # data are omitted column-wise or row-wise (please install and # load the irr package): #kendall(ConsistNA) # But the generalization of Kendall's W implemeted in irrNA # is able to assess the perfect concordance, assuming that # the data were at least ordinally scaled and not tied, e.g. # that each rater really ranked the objects that he rated # without giving equal ranks to two or more objects. kendallNA(ConsistNA) # # Example 2: data(IndepNA) # IndepNA exhibits missing values and zero variance between # the raters (just as well as between the objects): IndepNA # Common W-algorithms fail: #kendall(IndepNA) # kendallNA includes all (rater-pairwise) available data in # its calculation (e.g. only Objects 1--4 when Rater1 and # Rater2 are correlated): kendallNA(IndepNA) # # Example 3: data(IndepW) # IndepW exhibits missing values and a mean Spearman's rho, # that equals zero: IndepW # Again, common W-algorithms fail, #kendall(IndepW) # while kendallNA includes all (rater-pairwise) available # data: kendallNA(IndepW)
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