multiple comparisons in multi-factors MANOVA models

abou55 — Thu, 04 Mar 2021 13:46:49 GMT

For example:

How to conduct comparison tests to compare the averages of y1scores for x2 at levels 1 and 2 for each level of x1 (x1=1 and x1=2). That is

For x1=1: y1scores average (at x2=1) versus y1scores average (at x2=2)

For x1=2: y1scores average (at x2=1) versus y1scores average (at x2=2)

And same thing for x3 and x4

Also same thing for y2scores, y3scores, and y4scores.

Please see the SAS code below.

With many thanks in advance

Abou

------------ SAS Program and Data -------------

data data1;
input x1$ x2$ x3$ x4$ y1scores y2scores y3scores y4scores;
datalines;
1 2 1 2 8.22 5.50 8.58 6.89
1 2 1 2 5.60 4.41 6.90 6.20
1 2 1 1 6.44 6.73 6.32 5.78
1 2 1 1 4.77 5.33 5.97 6.96
1 2 1 1 6.83 6.79 7.29 7.87
1 2 2 2 12.98 9.04 9.41 10.43
1 2 1 2 5.85 9.00 8.65 6.30
1 2 1 2 8.03 7.43 7.47 8.66
1 1 2 2 4.84 5.52 4.81 4.44
1 2 1 2 7.21 6.63 6.33 7.32
1 2 1 1 16.36 10.46 7.85 11.28
1 2 2 2 8.37 7.40 9.66 9.99
1 2 1 1 6.78 4.60 5.62 6.60
1 2 2 2 10.37 7.14 9.98 8.69
1 2 1 2 8.43 7.54 7.56 7.75
1 2 1 2 6.23 5.80 6.20 5.99
1 2 2 2 10.20 6.00 8.49 10.49
1 2 1 2 8.66 5.42 6.48 8.57
1 2 1 1 6.98 5.28 4.39 7.06
1 2 1 1 4.70 4.96 4.89 7.58
1 2 2 2 11.42 8.80 11.10 10.46
1 2 2 2 7.73 7.42 9.38 8.28
1 2 1 1 9.81 6.00 10.08 7.15
1 2 1 2 4.61 3.79 6.42 5.55
1 1 1 2 9.83 12.17 15.41 17.03
1 2 1 2 3.33 3.19 3.49 5.07
1 2 1 2 5.08 3.91 4.89 4.35
1 2 2 2 5.38 6.00 5.89 4.69
1 2 1 2 4.92 4.91 6.54 5.57
1 2 1 2 7.65 9.91 12.54 8.83
1 2 1 2 8.46 9.31 8.71 8.53
1 2 2 2 4.62 4.17 4.77 5.95
1 2 2 1 7.67 6.12 6.79 6.36
1 2 1 1 6.52 4.83 5.59 6.00
1 2 2 2 5.48 4.50 5.66 6.15
1 2 1 2 4.93 4.80 6.17 6.48
1 2 1 1 8.31 6.22 6.67 10.73
2 2 1 1 7.24 7.64 11.59 6.86
1 2 1 1 3.91 2.94 4.27 3.21
2 2 1 2 8.58 7.80 7.87 6.87
2 2 1 2 7.96 3.14 3.77 5.88
1 2 1 1 6.77 7.85 7.49 5.72
2 2 1 1 8.03 11.74 6.99 6.53
2 2 1 1 8.92 6.91 6.77 10.05
1 1 2 2 12.02 7.33 7.22 12.37
1 2 1 1 5.96 3.80 3.98 6.83
1 2 2 1 7.70 5.45 7.93 6.06
2 2 1 1 5.89 4.77 5.67 9.72
2 2 1 2 9.64 10.80 8.61 10.20
2 2 1 1 7.08 5.12 5.94 4.97
2 2 1 1 7.95 6.19 6.60 6.14
2 2 1 1 9.30 4.75 6.47 5.64
2 2 2 2 15.43 8.71 9.14 17.98
2 2 1 1 4.20 5.99 4.47 4.23
2 2 1 1 7.09 8.35 6.74 7.18
1 1 2 2 7.42 5.97 6.45 6.65
2 2 1 1 6.70 5.86 7.93 10.36
2 2 1 2 9.37 7.44 14.35 17.63
2 2 1 1 6.36 4.75 4.39 6.78
1 1 2 2 9.82 5.46 15.79 10.71
1 2 1 2 4.36 4.60 5.36 5.77
2 2 1 1 6.69 8.05 6.46 8.30
2 2 1 1 6.77 5.23 6.16 5.48
1 2 1 1 4.14 3.42 4.99 4.32
2 2 1 1 14.39 5.84 4.88 7.29
1 2 1 2 9.58 8.19 17.33 9.09
2 2 1 1 6.29 5.09 5.56 5.44
2 2 1 1 16.09 11.37 14.84 9.77
1 2 1 2 10.39 6.12 7.76 8.35
1 1 2 2 11.07 12.48 8.99 10.74
1 2 1 1 6.28 4.35 6.12 6.50
1 2 1 1 5.83 4.45 6.89 6.39
1 2 1 2 4.35 5.43 3.96 4.32
1 2 1 1 15.06 9.03 8.32 7.43
2 2 1 2 4.22 3.78 5.40 5.51
1 2 1 2 5.98 5.00 5.83 4.67
1 2 1 2 5.04 3.69 5.42 4.93
1 2 1 2 4.14 4.13 5.20 5.07
1 2 1 2 6.00 5.11 5.87 4.94
1 2 1 2 6.25 5.35 5.51 6.39
1 2 2 2 5.59 5.98 8.54 5.20
1 1 2 2 8.63 5.86 7.27 6.80
1 2 1 2 7.82 6.61 7.57 7.41
1 2 1 2 9.01 10.33 12.48 11.40
2 2 1 1 6.73 5.09 5.65 6.52
2 2 1 1 9.80 5.75 8.36 6.85
1 2 1 2 7.14 6.23 7.67 8.22
1 2 1 2 5.37 3.76 6.05 6.61
2 2 1 1 13.25 7.85 14.67 14.60
1 2 1 1 3.80 4.11 4.20 5.10
2 2 1 1 6.28 5.96 4.59 4.70
2 2 2 2 6.00 5.44 6.19 6.75
2 2 1 1 7.41 6.57 8.74 10.00
2 2 1 2 7.33 7.88 9.08 7.64
2 2 1 2 14.97 8.95 16.24 13.83
2 2 1 2 4.88 4.44 5.89 6.89
2 2 1 1 5.92 5.84 6.90 7.54
2 2 1 1 5.77 7.68 6.03 7.08
2 2 1 1 5.66 4.83 6.31 7.25
1 2 1 1 4.49 3.42 4.13 3.09
2 2 1 1 11.19 8.05 10.61 10.36
2 2 1 2 5.27 4.04 4.57 8.63
2 2 1 2 6.93 5.63 5.83 8.11
2 2 1 2 5.11 4.12 8.19 6.52
2 2 1 2 14.92 10.73 12.58 17.11
2 2 1 2 6.01 5.82 6.22 7.90
2 2 1 1 8.05 6.45 5.36 6.25
2 2 1 1 7.55 5.41 7.48 8.67
2 2 1 1 6.45 5.48 7.85 7.48
2 2 1 1 5.28 4.75 5.81 5.59
2 2 1 1 5.65 5.32 6.21 7.23
1 2 1 1 6.85 5.98 8.89 8.94
2 2 1 1 9.33 5.94 10.94 7.17
2 2 1 1 7.89 5.24 7.31 9.39
2 2 1 1 7.93 10.11 11.77 14.54
2 2 1 2 5.67 6.11 5.36 6.30
1 2 1 1 7.50 5.99 5.50 7.21
1 2 1 2 7.32 6.86 7.11 6.73
1 2 1 2 9.72 9.99 14.04 10.42
2 2 1 1 12.80 5.30 7.41 6.39
1 2 1 2 9.18 8.26 6.70 8.22
1 2 2 2 12.03 8.92 12.87 10.07
1 2 1 1 4.33 4.43 4.91 4.84
1 2 1 2 9.21 8.11 8.71 9.41
2 2 1 1 8.00 5.47 6.46 8.10
;
run;

proc print data = data1;
run;

/* MANOVA Model */

PROC GLM DATA = data1;
CLASS x1 x2 x3 x4;
MODEL y1scores y2scores y3scores y4scores = x1 | x2 | x3 | x4 @2;
MANOVA H = _ALL_ ;
run;

/* Sort data1 by x1 */

proc sort data=data1 out = data1sort;
by x1;
run;

Re: multiple comparisons in multi-factors MANOVA models

jiltao — Thu, 04 Mar 2021 15:36:08 GMT

You could use the LSMEANS statement in PROC GLM. For example,

lsmeans x1*x2 / slice=x1 diff;

You could get the test for the x2 effect for each level of x1 for y1score to y4score respectively.

The problem here is with your data. Many of the LSMEANS are nonestimable, so the LSMEANS statement above will probably not produce anything useful.

The reasons for nonestimable LSMEANS in your case might be --

1. There is an empty cell for x1*x2 which makes some lsmeans non-estimable. (I did not look at all other two way interactions so there might be other interaction terms with empty cells too).

2. You have confoundings in your data/model, so some effects have 0 df and therefore cannot be tested. This is indicated in the Log --

NOTE: H Matrix for x1*x2 has zero d.f.

NOTE: H Matrix for x2*x4 has zero d.f.

As a matter of fact, if you add the E option in the MODEL statement you will see the General Form of Estimable Functions table, which confirms the confounding in your data/model.

You might want to remove the effects that are confounded with other effects in the model. For example,

PROC GLM DATA = data1;
CLASS x1 x2 x3 x4;
MODEL y1scores y2scores y3scores y4scores = x1 x2 x3 x4 x1*x3 x1*x4 x2*x3 x3*x4 ;
MANOVA H = _ALL_ ;
lsmeans x1*x3 / slice=x1 diff;
lsmeans x1*x4 / slice=x1 diff;
run;
quit;

Re: multiple comparisons in multi-factors MANOVA models

abou55 — Thu, 04 Mar 2021 17:39:27 GMT

Dear All:

Thank you very much for your help with this problem.

with many thanks

abou

topic multiple comparisons in multi-factors MANOVA models in Statistical Procedures

multiple comparisons in multi-factors MANOVA models

Re: multiple comparisons in multi-factors MANOVA models

Re: multiple comparisons in multi-factors MANOVA models