Diff for "FAQ/mds/stress" - CBU statistics Wiki
location: Diff for "FAQ/mds/stress"
Differences between revisions 1 and 7 (spanning 6 versions)
Revision 1 as of 2006-08-15 09:06:44
Size: 743
Editor: PeterWatson
Comment:
Revision 7 as of 2011-09-13 09:34:33
Size: 2002
Editor: PeterWatson
Comment:
Deletions are marked like this. Additions are marked like this.
Line 1: Line 1:
The measure of goodness of fit in multidimensional scaling is called S(caled)-Stress! It measures the difference between the observed (dis)similarity matrix e.g. reaction time between semantic pairs and the estimated one using one or more estimated stimuli dimensions. The lower the stress the better the fit.
Line 2: Line 3:
The measure of goodness of fit in multidimensional scaling is called Stress! It measures the difference between the observed (dis)similarity matrix e.g. reaction time between semantic pairs and the estimated one using one or more dimensions. The lower the stress the better the fit. Dimensions are similar to factors as they give the number of facets of the relationships between stimuli and may be plotted. Hair et al(1998) have rules of thumb for what values of stress make a good fit. Dimensions are similar to factors as they give the number of facets of the relationships between stimuli and may be plotted. S-Stress is standardised to take values between 0 and 1. Hair et al(1998) rules of thumb for what values of S-Stress make a good fit.
Line 4: Line 5:
100 x Stress
Line 6: Line 6:
20% or above Very poor (not worth doing)
10% Fair
 5% Good
2.5% Excellent
 0% Perfect fit!


||||<50% style="TEXT-ALIGN: center"> '''100 x Stress''' || '''Goodness of Fit'''||
||||<50% style="VERTICAL-ALIGN: top; TEXT-ALIGN: center"> 20% or above || Very Poor (not worth doing) ||
||||<50% style="VERTICAL-ALIGN: top; TEXT-ALIGN: center"> 10%-19.9% || Fair ||
||||<50% style="VERTICAL-ALIGN: top; TEXT-ALIGN: center"> 5%-9.9% || Good ||
||||<50% style="VERTICAL-ALIGN: top; TEXT-ALIGN: center"> 2.5%-4.9% || Excellent ||
||||<50% style="VERTICAL-ALIGN: top; TEXT-ALIGN: center"> 0%-2.4% || Near Perfect Fit ||
 
An R-squared may also be computed in SPSS to determine what proportion of variance of the scaled data can be accounted for by the MDS procedure. R-squared represents the squared correlation coefficient between the estimated distances and the observed distances between data points and is analogous to the R-squared in multiple regression. An R-square of 0.6 is considered the minimum acceptable level (Hair et al, 1998). An R-square of 0.8 is considered good for metric scaling and 0.9 is considered good for non-metric scaling.

__References__

Hair Jr, JF, Anderson, RE, Tatham, RL and Black WC (1998) Multivariate data analysis. Fifth Edition. Prentice-Hall:New Jersey.

Hair Jr, JF, Black, B, Babin, B, Anderson, RE and Tatham, RL (2005) Multivariate data analysis. Sixth Edition. Prentice-Hall:New Jersey. ''IN CBSU LIBRARY''. A 1995 edition is also in the ''CBSU LIBRARY''.

The measure of goodness of fit in multidimensional scaling is called S(caled)-Stress! It measures the difference between the observed (dis)similarity matrix e.g. reaction time between semantic pairs and the estimated one using one or more estimated stimuli dimensions. The lower the stress the better the fit.

Dimensions are similar to factors as they give the number of facets of the relationships between stimuli and may be plotted. S-Stress is standardised to take values between 0 and 1. Hair et al(1998) rules of thumb for what values of S-Stress make a good fit.

100 x Stress

Goodness of Fit

20% or above

Very Poor (not worth doing)

10%-19.9%

Fair

5%-9.9%

Good

2.5%-4.9%

Excellent

0%-2.4%

Near Perfect Fit

An R-squared may also be computed in SPSS to determine what proportion of variance of the scaled data can be accounted for by the MDS procedure. R-squared represents the squared correlation coefficient between the estimated distances and the observed distances between data points and is analogous to the R-squared in multiple regression. An R-square of 0.6 is considered the minimum acceptable level (Hair et al, 1998). An R-square of 0.8 is considered good for metric scaling and 0.9 is considered good for non-metric scaling.

References

Hair Jr, JF, Anderson, RE, Tatham, RL and Black WC (1998) Multivariate data analysis. Fifth Edition. Prentice-Hall:New Jersey.

Hair Jr, JF, Black, B, Babin, B, Anderson, RE and Tatham, RL (2005) Multivariate data analysis. Sixth Edition. Prentice-Hall:New Jersey. IN CBSU LIBRARY. A 1995 edition is also in the CBSU LIBRARY.

None: FAQ/mds/stress (last edited 2014-10-07 14:55:10 by PeterWatson)