Repeated Measures Designs In a Repeated Measures Design
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Repeated Measures Designs
In a Repeated Measures Design We have experimental units that • may be grouped according to one or several factors (the grouping factors) Then on each experimental unit we have • not a single measurement but a group of measurements (the repeated measures) • The repeated measures may be taken at combinations of levels of one or several factors (The repeated measures factors)
Example 1 • No grouping factors • One repeated measure factor (time)
Example In the following study the experimenter was interested in how the level of a certain enzyme changed in cardiac patients after open heart surgery. The enzyme was measured • immediately after surgery (Day 0), • one day (Day 1), • two days (Day 2) and • one week (Day 7) after surgery for n = 15 cardiac surgical patients.
The data is given in the table below. Table: The enzyme levels -immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery
• The subjects are not grouped (single group). • There is one repeated measures factor -Time – with levels – Day 0, – Day 1, – Day 2, – Day 7 • This design is the same as a randomized block design with – Blocks = subjects
The Anova Model for a simple repeated measures design Repeated measures subjects y 11 y 12 y 13 … y 1 t y 21 y 22 y 23 … y 2 t yn 1 yn 2 y 13 … ynt
The Model yij = the jth repeated measure on the ith subject = m + ai + tj + eij where m = the mean effect, ai = the effect of subject i, tj = the effect of time j, eij = random error.
The Analysis of Variance The Sums of Squares - used to measure the variability of ai (between subject variability) - used to test for the differences in tj (time) - used to measure the variability of eij (within subject variability)
ANOVA table – Repeated measures (no grouping factor, 1 repeated measures factor (time)) Source S. S. d. f. Between Subject Error n-1 Time t-1 Between Subject Error (n - 1)(t - 1) M. S F
The Anova Table for Enzyme Experiment The Subject Source of variability is modelling the variability between subjects The ERROR Source of variability is modelling the variability within subjects
The repeated measures are in columns Analysis Using SPSS - the data file
Select General Linear model -> Repeated Measures
Specify the repeated measures factors and the number of levels
Specify the variables that represent the levels of the repeated measures factor There is no Between subject factor in this example
The ANOVA table
The Anova Table for Enzyme Experiment The Subject Source of variability is modelling the variability between subjects The ERROR Source of variability is modelling the variability within subjects
The general Repeated Measures Design g groups of n subjects t repeated measures
In a Repeated Measures Design We have experimental units that • may be grouped according to one or several factors (the grouping factors – df = g - 1) Then on each experimental unit we have • not a single measurement but a group of measurements (the repeated measures) • The repeated measures may be taken at combinations of levels of one or several factors (The repeated measures factors – df = t - 1) • There also the interaction effects between the grouping and repeated measures factors – df = (g -1)(t -1)
The Model - Repeated Measures Design
ANOVA table for the general repeated measures design Source d. f. Main effects and interactions of g-1 grouping factors Between subject Error g(n – 1) interactions of grouping factors with repeated measures factors (t – 1)(g – 1) Main effects and interactions of repeated measures factors t-1 Within subject Error g(t – 1)(n – 1)
Example : (Repeated Measures Design - Grouping Factor) • In the following study, similar to example 3, the experimenter was interested in how the level of a certain enzyme changed in cardiac patients after open heart surgery. • In addition the experimenter was interested in how two drug treatments (A and B) would also effect the level of the enzyme.
• The 24 patients were randomly divided into three groups of n= 8 patients. • The first group of patients were left untreated as a control group while • the second and third group were given drug treatments A and B respectively. • Again the enzyme was measured immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery for each of the cardiac surgical patients in the study.
Table: The enzyme levels - immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery for three treatment groups (control, Drug A, Drug B)
• The subjects are grouped by treatment – control, – Drug A, – Drug B • There is one repeated measures factor -Time – with levels – Day 0, – Day 1, – Day 2, – Day 7
The Anova Table There are two sources of Error in a repeated measures design: The between subject error – Error 1 and the within subject error – Error 2
The Model yikj = the jth repeated measure on the ith subject in the kth group = m + ak +ekj (1) + tj + (at)ki + ekij(2) where m = the mean effect, ak = the effect of group i, eij(1) = between subject error. tj = the effect of time j,
(at)kj = the group-time interaction effect eij(2) = within subject error.
Tables of means Drug Control A B Overall Day 0 118. 63 103. 25 103. 38 108. 42 Day 1 77. 88 68. 25 69. 38 71. 83 Day 2 60. 50 52. 00 54. 13 55. 54 Day 7 55. 75 51. 50 52. 92 Overall 78. 19 68. 75 69. 59 72. 18
Example : Repeated Measures Design - Two Grouping Factors • In the following example , the researcher was interested in how the levels of Anxiety (high and low) and Tension (none and high) affected error rates in performing a specified task. • In addition the researcher was interested in how the error rates also changed over time. • Four groups of three subjects diagnosed in the four Anxiety-Tension categories were asked to perform the task at four different times patients in the study.
The number of errors committed at each instance is tabulated below.
The Model ykmji = the ith repeated measure on the jth subject when Anxiety (A) is at the kth level and Tension (T) is at the mth level = m + ak + bm + (ab)km +ekmj (1) + ti + (at)ki + (bt)mi + (abt)kmi + eikmji(2) where m = the mean effect, ak = the effect of Anxiety k, bm = the effect of Tension m, (ab)km = Anxiety–Tension interaction m, ekmj(1) = between subject error. kmj
tj = the effect of time j, (at)ki = the anxiety-time interaction effect (bt)mi = the tension-time interaction effect (abt)kmi = the tension-time interaction effect ekmji(2) = within subject error. kmji
The Anova Table
The Multivariate Model for a Repeated measures design
The Anova (univariate) Model yij = the jth repeated measure on the ith subject = m + aj + tj + eij where m = the mean effect, aj = the effect of subject i, tj = the effect of time j, eij = random error.
Implications of The Anova (univariate) Model mj = the mean of y ij = m + 0 + tj + 0 = m + tj
The implication of the ANOVA model for a repeated measures design is that the correlation between repeated measures is constant.
The multivariate model for a repeated measures design Let denote a sample of n from the p-variate normal distribution with mean vector and covariance matrix S. Here Allows for arbitrary correlation structure amongst the repeated measures – yi 1, yi 2, … , yit
Test for equality of repeated measures
Repeated measures equal X 1 2 3 … repeated measures t
Let Then
The test for equality of repeated measures: Consider the data This is a sample of n from the (t – 1)-variate normal distribution with mean vector and covariance matrix.
Hotelling’s T 2 test for equality of variables if H 0 is true than has an F distribution with n 1 = t – 1 and n 2 = n - t + 1 Thus we reject H 0 if F > Fa with n 1 = p – 1 and n 2 = n – t + 1
To perform the test, compute differences of successive variables for each case in the group and perform the one-sample Hotelling’s T 2 test for a zero mean vector
Example
Example In the following study the experimenter was interested in how the level of a certain enzyme changed in cardiac patients after open heart surgery. The enzyme was measured • immediately after surgery (Day 0), • one day (Day 1), • two days (Day 2) and • one week (Day 7) after surgery for n = 15 cardiac surgical patients.
The data is given in the table below. Table: The enzyme levels -immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery
Example : (Repeated Measures Design - Grouping Factor) • In the following study, similar to example 3, the experimenter was interested in how the level of a certain enzyme changed in cardiac patients after open heart surgery. • In addition the experimenter was interested in how two drug treatments (A and B) would also effect the level of the enzyme.
• The 24 patients were randomly divided into three groups of n= 8 patients. • The first group of patients were left untreated as a control group while • the second and third group were given drug treatments A and B respectively. • Again the enzyme was measured immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery for each of the cardiac surgical patients in the study.
Table: The enzyme levels - immediately after surgery (Day 0), one day (Day 1), two days (Day 2) and one week (Day 7) after surgery for three treatment groups (control, Drug A, Drug B)
• The subjects are grouped by treatment – control, – Drug A, – Drug B • There is one repeated measures factor -Time – with levels – Day 0, – Day 1, – Day 2, – Day 7
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