Optimal designs for paired comparisons of partial profiles

Summary

This page provides optimal designs for paired comparisons of partial profiles for choice experiments and conjoint analysis (ACA like graded paired comparisons). It is assumed that the set of attributes used to describe options can be partitioned into two groups such that the attributes in each group have the same number of levels. The total number of attributes considered ranges from four to six. The common number of levels for attributes in the first group is between two and four and attributes in the second group can have up to five levels. The number of attributes on which the two options in a pair differ is either two or three. In order to be practical, only optimal designs with up to 100 paired comparisons are presented.

Construction methods are described in:
Großmann, H., Graßhoff, U. and Schwabe, R. (2009). Approximate and exact optimal designs for paired comparisons of partial profiles when there are two groups of factors. Journal of Statistical Planning and Inference 139, 1171-1179.

How to read the table

Design: Click on name to display design in a new window
Parameters
- K: Total number of attributes used to describe options
- K₁: Number of attributes in the first group
- K₂: Number of attributes in the second group
- u₁: Common number of levels for all attributes in the first group
- u₂: Common number of levels for all attributes in the second group
- S: The profile strength, that is, the number of attributes for which the two options in each pair have different levels
Pairs:

Optimal designs
	Parameters								Parameters
Design	K	K₁	K₂	u₁	u₂	S	Pairs	Design	K	K₁	K₂	u₁	u₂	S	Pairs
PP01	4	1	3	2	3	3	42	PP26	5	3	2	3	4	3	96
PP02	4	2	2	2	3	2	18	PP27	5	4	1	2	3	2	36
PP03	4	2	2	2	3	3	12	PP28	5	4	1	2	3	3	24
PP04	4	2	2	2	4	2	16	PP29	5	4	1	2	4	2	28
PP05	4	2	2	2	4	3	24	PP30	5	4	1	2	4	3	24
PP06	4	2	2	2	5	2	50	PP31	5	4	1	2	5	2	40
PP07	4	2	2	2	5	3	40	PP32	5	4	1	2	5	3	40
PP08	4	2	2	3	4	2	60	PP33	6	2	4	2	3	2	30
PP09	4	2	2	3	5	2	90	PP34	6	2	4	2	4	2	28
PP10	4	3	1	2	3	2	30	PP35	6	2	4	2	5	2	90
PP11	4	3	1	2	3	3	36	PP36	6	2	4	3	4	2	96
PP12	4	3	1	2	4	2	12	PP37	6	3	3	2	3	2	54
PP13	4	3	1	2	4	3	72	PP38	6	3	3	2	3	3	36
PP14	4	3	1	2	5	2	60	PP39	6	3	3	2	4	2	48
PP15	4	3	1	3	4	2	54	PP40	6	3	3	2	4	3	32
PP16	5	1	4	2	3	3	36	PP41	6	3	3	2	5	3	100
PP17	5	2	3	2	3	2	24	PP42	6	4	2	2	3	2	24
PP18	5	2	3	2	3	3	96	PP43	6	4	2	2	3	3	32
PP19	5	2	3	2	4	2	44	PP44	6	4	2	2	4	2	20
PP20	5	2	3	2	5	2	70	PP45	6	4	2	2	4	3	80
PP21	5	3	2	2	3	2	42	PP46	6	4	2	2	5	2	60
PP22	5	3	2	2	3	3	28	PP47	6	4	2	2	5	3	40
PP23	5	3	2	2	4	2	18	PP48	6	4	2	3	4	2	84
PP24	5	3	2	2	4	3	24	PP49	6	5	1	2	4	2	80
PP25	5	3	2	3	4	2	72	PP50	6	5	1	2	5	2	90

Using the designs

The designs presume that only main effects (part-worth utilities) are to be estimated; they are not suitable for models with interactions
Attributes are labeled with capital letters: A, B, C,...
The first K₁ attributes have u₁ levels and the remaining K₂ attributes have u₂ levels. Levels are numbered 1, 2,...
- Example: Design PP01
  Since K₁=1, K₂=3, u₁=2 and u₂=3, attribute A has 2 levels whereas attributes B, C and D have 3 levels each
Meaning of the star symbol (*)
- A * indicates that the level of an attribute is the same for both options in a pair
  - Example: Design PP02
    The options in the first two pairs of the design have common levels for attributes C and D
    
    Option 1 Option 2
    
    Pair A B C D A B C D
    
    1 1 1 * * 2 2 * *
    
    2 1 2 * * 2 1 * *
- In practice, common levels are often not shown when pairs are presented for evaluation
  - Example: Design PP02
    When the two pairs in the above table are presented, often only levels of attributes A and B are used
- Alternatively, if the level of an attribute is a * for both options in a pair, this can be replaced with the same (arbitrarily chosen) level of the attribute.
  - Example: Design PP02
    Attributes C and D both have 3 levels. So in the above table in the first pair the * for C can be replaced with the level 1 and the * star for D with the level 3. In the second pair, the shared level for C could be 2 and the common level for D could be 1 to give
    
    Option 1 Option 2
    
    Pair A B C D A B C D
    
    1 1 1 1 3 2 2 1 3
    
    2 1 2 2 1 2 1 2 1
Randomization
- The pairs should be presented in random order
- Within each pair it should be decided at random which option is presented first.
  Similarly, if the two options in each pair are presented simultaneously on a computer screen, use a random mechanism to decide which one appears on the left respectively right side of the screen.
  - Example: Design PP01
    The first two pairs of the design in the table are
    
    Option 1 Option 2
    
    Pair A B C D A B C D
    
    1 1 1 1 * 2 2 2 *
    
    2 1 2 2 * 2 3 3 *
    
    A possible outcome of the randomization could be that in the first pair options 1 and 2 are swapped while in the second pair their order remains unchanged:
    
    Option 1 Option 2
    
    Pair A B C D A B C D
    
    1 2 2 2 * 1 1 1 *
    
    2 1 2 2 * 2 3 3 *
- Designs remain optimal after randomizing pairs and options within pairs
- Do not randomize attribute levels within options
The designs can be easily pasted into a text editor such as notepad, winedt etc.

	Option 1	Option 2
1	1	1	*	*	2	2	*	*
2	1	2	*	*	2	1	*	*

	Option 1	Option 2
1	1	1	1	3	2	2	1	3
2	1	2	2	1	2	1	2	1

	Option 1	Option 2
1	1	1	1	*	2	2	2	*
2	1	2	2	*	2	3	3	*

	Option 1	Option 2
1	2	2	2	*	1	1	1	*
2	1	2	2	*	2	3	3	*

Page maintained by Heiko Grossmann

Page updated 23/04/09