springall: Springall (1973) Data on Subjective Evaluation of Flavour Strength

Description

Data from Section 7 of the paper by Springall (1973) on Bradley-Terry response surface modelling. An experiment to assess the effects of gel and flavour concentrations on the subjective assessment of flavour strength by pair comparisons.

Usage

springall

Arguments

Format

A list containing two data frames, springall$contests and springall$predictors.

The springall$contests data frame has 36 observations (one for each possible pairwise comparison of the 9 treatments) on the following 7 variables:

row: a factor with levels 1:9, the row number in Springall's dataset
col: a factor with levels 1:9, the column number in Springall's dataset
win: integer, the number of wins for column treatment over row treatment
loss: integer, the number of wins for row treatment over column treatment
tie: integer, the number of ties between row and column treatments
win.adj: numeric, equal to win + tie/2
loss.adj: numeric, equal to loss + tie/2

The predictors data frame has 9 observations (one for each treatment) on the following 5 variables:

flav: numeric, the flavour concentration
gel: numeric, the gel concentration
flav.2: numeric, equal to flav^2
gel.2: numeric, equal to gel^2
flav.gel: numeric, equal to flav * gel

Details

The variables win.adj and loss.adj are provided in order to allow a simple way of handling ties (in which a tie counts as half a win and half a loss), which is slightly different numerically from the Rao and Kupper (1967) model that Springall (1973) uses.

References

Rao, P. V. and Kupper, L. L. (1967) Ties in paired-comparison experiments: a generalization of the Bradley-Terry model. Journal of the American Statistical Association, 63, 194--204.

Examples

Run this code

# NOT RUN {
##
## Fit the same response-surface model as in section 7 of 
## Springall (1973).
##
## Differences from Springall's fit are minor, arising from the 
## different treatment of ties.
##
## Springall's model in the paper does not include the random effect.  
## In this instance, however, that makes no difference: the random-effect 
## variance is estimated as zero.
##
summary(springall.model <- BTm(cbind(win.adj, loss.adj), col, row, 
                               ~ flav[..] + gel[..] + 
                                 flav.2[..] + gel.2[..] + flav.gel[..] +
                                 (1 | ..),
                               data = springall))

# }

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