1. Multi‑Criteria Decision Making
Dr. Shahram Yazdani

2. The Nature of Decision-Making in Healthcare System
Process is interactive - involves group of persons
Multiple criteria (objectives/attributes)
Interaction among criteria/objectives
Need for a standard process - need for consistency and continuity
Time dependent: both short- and long-term

3. Multi‑Criteria Decision Making
Ben Franklin over 200 years ago recognized the presence of multiple attributes in everyday decisions and suggested a workable solution
Major development in theory and practice since 1970

4. Decision-Making Strategies
Optimizing
Satisficing
Elimination-by-aspects
Incrementalism
Mixed scanning
Analytic Hierarchy Process

5. Decision-Making Strategies : Optimization
Select the alternative that gives the best overall value
Identify criteria to judge alternatives
Can be expressed in mathematical terms and implemented using computer programs
Difficult to solve when model involves qualitative criteria
Optimization of “Utility Super Function”

6. Decision-Making Strategies : Satisficing
Recognizes that “utility super functions” are difficult to formulate and In most cases one doesn’t want optimality
Understand decision process (flow) (Sequence in which alternatives are identified and considered; usually governed by heuristics)
Decision maker is therefore part of the multi-objective problem
Select the first alternative that is good enough with respect to some minimal criteria
Cutoff level of constraints
Simon: satisficing or finding solutions that are good enough e.g. Goal Programming
Keen: viewed requirement of assigning weights or priorities to be problematic. Noninferior sets.

7. Decision-Making Strategies : Elimination-by-Aspects
Elimination of all alternatives that fail with respect to one aspect, then consider another aspect …
An aspect is like a constraint involving one or more criteria
Order of aspects can strongly influence results
An alternative that superior in many aspects may be eliminated

8. Decision Making Strategies: Incrementalism
Compare alternative courses of action to the current course of action
Look for alternatives that can overcome shortcomings of the current course of action
A decision that results in incremental improvement

9. Decision Making Strategies: Mixed Scanning
Scanning: Collection, processing, evaluating and weighing of information
Importance of decision determines the degree of scanning and choice
Each alternative is briefly considered
Reject alternatives for which strong objections are detected

10. Decision Making Strategies: Analytic Hierarchy Process
Decomposes the overall decision objective into a hierarchic structure of criteria, subcriteria, and alternatives
Pairwise comparison matrix for criteria, subcriteria and alternatives
Matrices are mathematically processed to calculate relative weights of criteria and sub criteria
Relative weights are used to arrive at a score for each alternative

11. Decision Making : Other Strategies
Dominance rule
Select the alternative that is better than other alternative(s) on at least one attribute and not worse on other attributes
Lexicographic rule
Starts with the most important attribute and selects the attribute that ranks highest on that attribute
If two or more are tied, proceed to the next important attribute
Maximizing number of attributes with greater attractiveness rule
Classify each alternative as better, equal or worse on each attribute
Select the alternative with the greater number of favorable attributes

12. Decision Making Strategies: Other Strategies
Conjunctive decision making
Compare all attributes of one alternative against all criteria
Reject the alternatives that do not meet the criteria
Additive linear rule
Start with a set of predetermined weights of each alternative on each attribute (A)
Allocate weights against the attributes (B)
Multiply (A) by (B) to determine the score for each alternative
Select the alternative having the highest score

13. Political Approaches
Actions and decisions result from bargaining among players
To predict decision, find out:
who the players are
what are the players’ interests or stands?
what are the players’ relative influence?
How does the combined dynamics of the above affect the decisions

14. Anarchic Theory of Decision-Making
Decision-making in organizations are random and disjointed
e.g. Lindblom: “muddling-through” concept of decision theory; avoid comprehensive analysis and concentrate on marginal gains
An organization is a collection of:
choices looking for problems
issues and feelings waiting for decision situations
solutions looking for issues they apply to; or
decision makers looking for work
so-called organized anarchy.

15. Major categories of MCDM methods
A normative approach the disregards decision maker
Statement of decision maker’s preference prior to analysis
Interactive responses between analyst and decision maker
Generation of noninferior (nondominated) solutions that decision maker selects from.

16. Multiple Criteria Decision Making
Multiple Objective Decision Making
MODM: used primarily for designing
Multiple Attribute Decision Making
MADM: used primarily for choosing an alternative

17. Multiple‑Objective Decision Making
Dr. Shahram Yazdani

18. Multi‑Objective Decision Making
Some decisions involve more than one objective.
Utility theory provides a methodology that allows a subjective tradeoff among valued attributes.

19. Approach is demonstrated with a decision table:

20. EV(Alternative j)
The expected effectiveness of each decision alternative is the weighted average of the probabilities with the utilities as weights.
EV(Aj) = i=1,n Ui pij j=1,…m

21. Relative Utilities Every objective must has a utility value
The most important objective has the highest utility value
3. The utility value of achieving 2 objectives is the sum of the individual utility values

22. Advantages of Methodology
Clearly shows interrelationships among objectives and alternatives
Allows non-quantifiable objectives

23. Problems
Difficult to get consistent utilities, meaningful probabilities, realistic objectives and feasible alternatives
2. Must generate new utilities in every situation for every individual or group

24. Multiple Attribute Decision Making
Dr. Shahram Yazdani

25. continuous discrete quantitative Qualitative/ mixed Nature of
alternatives
continuous
discrete
Linear programming
Goal programming
Nature of
Criteria/
objective
quantitative
Qualitative/
mixed
Multi-attribute utility theory
Weighted summation
Ideal point method
Concordance analysis
AHP
Regime Method
Evamix Method
ELECTRE

26. Generic process for MCDM
Identify
objectives
Develop
Criteria/
attributes
Identify
alternatives
Weight
Criteria/
attributes
Rank
alternatives
Choose
alternative

27. MADM Matrix
Attributes X1 X2 X3 Xn A1 A2 A3 Am
Alternatives

28. Give Numerical Values to Attributes of Each Alternative
Consider simple measures in simple quantitative attributes
Consider decision tree analysis in complex quantitative attributes
Consider pair wise comparison in qualitative attributes

29. MADM Matrix X1 X2 X3 Xn A1 A2 A3 Am Attributes Alternatives
v1n A2
v21
v22
v23
v2n A3
v31
v32
v33
v3n Am
vm1
vm2
vm3
vmn
Alternatives
vij is the specific value of attribute Xj for alternative Ai

30. Standardizing the attribute values
Normalization
Linear
Fuzzy j
rij =
vij – min vij
maxvij – min vij
For positive attributes
Where more is better j
rij =
max vij – vij
maxvij – min vij
For negative attributes
Where less is better

31. Standardized attributesX1 X2 X3 Xn A1
r11
r12
r13
r1n A2
r21
r22
r23
r2n A3
r31
r32
r33
r3n Am
rm1
rm2
rm3
rmn
Alternatives
rij is the standardized value of attribute Xj for alternative Ai

32. Weight of each attributeWn X1 X2 X3 Xn A1
r11
r12
r13
r1n A2
r21
r22
r23
r2n A3
r31
r32
r33
r3n Am
rm1
rm2
rm3
rmn
Alternatives

33. Weighting methods for attributes
Fixed Point Scoring
Paired Comparisons
Judgment Analysis

34. Give to each attribute a weight
Fixed Point Scoring
Give to each attribute a weight
(<1) that sum up in 1
Attribute 1
Attribute 2
Attribute 3
Attribute n W1 W2 W3 Wn 1

35. Paired Comparisons of Attributes Importance

36. Paired Comparisons
attributes X1 X2 X3 X4 X1 X2 X3 X4
n×n AHP matrix

37. Paired Comparisons Bipolar Scale for positive attributes
Equally
Important
Slightly
More
Moderately
Very
Bipolar Scale for positive attributes
Less

38. Paired Comparisons Perform Pairwise Comparison attributes X1 X2 X3 X45 5 7 X2 1 3 3 X3 1 9 X4 1

39. Perform Pairwise Comparison
Paired Comparisons
Perform Pairwise Comparison
Using reciprocals
attributes X1 X2 X3 X4 X1 1 5 5 7 X2
0.2 1 3 3 X3
0.2
0.33 1 9 X4
0.14
0.33
0.11 1

40. Paired Comparisons Sum the columns attributes X1 X2 X3 X4 X1 1 5 5 7
0.2 1 3 3 X3
0.2
0.33 1 9 X4
0.14
0.33
0.11 1
Totals
1.54
6.66
9.11 20

41. Normalize the values in each column
Paired Comparisons
Normalize the values in each column
attributes X1 X2 X3 X4 X1
0.65 1 5
0.75
0.55 5
0.35 7 X2
0.2
0.13
0.15 1 3
0.33 3
0.15 X3
0.2
0.13
0.05
0.33 1
0.11 9
0.45 X4
0.14
0.09
0.33
0.05
0.01
0.11 1
0.05
Totals
1.54 1
6.66 1
9.11 1 20 1

42. Calculate sum of normalized values for
Paired Comparisons
Calculate sum of normalized values for
Each row
attributes X1 X2 X3 X4
Sum X1 1
0.65
0.75 5 5
0.55 7
0.35
2.3 X2
0.13
0.2
0.15 1
0.33 3
0.15 3
0.76 X3
0.2
0.13
0.33
0.05 1
0.11
0.45 9
0.74 X4
0.14
0.09
0.33
0.05
0.01
0.11
0.05 1
0.2
Totals
1.54
6.66
9.11 20

43. Calculate the Average (weight) for
Paired Comparisons
Calculate the Average (weight) for
Each Row
attributes X1 X2 X3 X4
Sum
Average
(W) X1 1
0.65
0.75 5
0.55 5 7
0.35
2.3
0.575 X2
0.13
0.2
0.15 1 3
0.33 3
0.15
0.76
0.19 X3
0.2
0.13
0.05
0.33
0.11 1
0.45 9
0.74
0.185 X4
0.14
0.09
0.05
0.33
0.01
0.11
0.05 1
0.2
0.05
Totals
1.54
6.66
9.11 20
4.00
1.00

44. Analytical hierarchic process

45. Analytical hierarchic process
Information is decomposed into a hierarchy of alternatives and criteria
Information is then synthesized to determine relative ranking of alternatives
Both qualitative and quantitative information can be compared using informed judgements to derive weights and priorities

46. Analytical hierarchic process
Classifying attributes in a hierarchic model
No end branch should contain more than 10 (preferably 8) attribute
Begin cross sectional weighting at root side of three and progress to the end branch side of three
At each level if the number of items are less than 6 (preferably 4) use fixed point scoring otherwise use paired comparison through AHP matrix
Combine cross sectional weights into hierarchical weights which must sum up to 1 for end branches

47. Hierarchic Organization of Attributes

48. End Branch Attributes

49. Determine simple weight of attributes

50. Determine simple weight of attributes1 w1 w2 w3 1
w11
w12
w13
w14
w31
w32 1
w111
w112
w141
w142
w143
w321
w322
w323

51. Determine final weight of attributes
w11
w12
w13
w14
w31
w32
w111
w112
w141
w142
w143
w321
w322
w323
Wf1

52. Determine final weight of attributes
w11
w12
w13
w14
w31
w32
Wf4
w111
w112
w141
w142
w143
w321
w322
w323

53.  Wfi = 1 Determine final weight of attributes Wf3 Wf4 Wf8 Wf1 Wf2 Wf5

54. Analytical hierarchic process
Application areas
strategic planning
resource allocation
source selection, program selection
business policy
etc., etc., etc..
AHP software (ExpertChoice)
computations
sensitivity analysis
graphs, tables
Group AHP

55. Weight of each attributeWn X1 X2 X3 Xn A1
r11
r12
r13
r1n A2
r21
r22
r23
r2n A3
r31
r32
r33
r3n Am
rm1
rm2
rm3
rmn
Alternatives

56. Weighted value of attributes for alternativesX1 X2 X3 Xn A1
R11
R12
R13
R1n A2
R21
R22
R23
R2n A3
R31
R32
R33
R3n Am
Rm1
Rm2
Rm3
rmn
Alternatives
Rij = rij × Wj

57. Scoring Alternatives: Weighted summation
Attributes X1 X2 X3 Xn
Score A1
R11
R12
R13
R1n S1 A2
R21
R22
R23
R2n S2 A3
R31
R32
R33
R3n S3 Am
Rm1
Rm2
Rm3
rmn Sm
Alternatives
Si = ΣRij
Si = Σrij×wj
J= n
J= n

58. Judgement Analysis through Virtual Portfolios
Dr. Shahram Yazdani

59. Judgement analysis through virtual portfolios
Choosing the right people
Defining objectives and options
Determining ranking attributes
Defining ranking attributes
Scaling ranking attributes
Constructing random virtual portfolios
Ranking or scoring virtual portfolios by panel
performing stepwise regression analysis
Finding independent attributes and their weight (regression coefficient)
Formulating ranking equation
Assessing the validity and reliability of equation on a separate set of portfolios

60. Level 1
Level 2
Level 3
Level 4
Level 5
Attribute 1
S11
S12
S13
S14
S15
Attribute 2
S21
S22
S23
S24
S25
Attribute 3
S31
S32
S33
S34
S35
Attribute 4
S41
S42
S43
S44
S45
Attribute 5
S51
S52
S53
S54
S55
Attribute 6
S61
S62
S63
S64
S65
Attribute 7
S71
S72
S73
S74
S75

61. Random Virtual Portfolio 1
Level 1
Level 2
Level 3
Level 4
Level 5
Attribute 1
S11
S12
S13
S14
S15
Attribute 2
S21
S22
S23
S24
S25
Attribute 3
S31
S32
S33
S34
S35
Attribute 4
S41
S42
S43
S44
S45
Attribute 5
S51
S52
S53
S54
S55
Attribute 6
S61
S62
S63
S64
S65
Random Virtual
Portfolio 1
Attribute 7
S71
S72
S73
S74
S75
S11
S25
S32
S54
S61
S74
S74

62. Ranking of virtual portfolios5 3
Random Virtual
Portfolio 1 8
Random Virtual
Portfolio 1 6
Random Virtual
Portfolio 1 1
Random Virtual
Portfolio 1 2
Random Virtual
Portfolio 1 7
Random Virtual
Portfolio 1 3
Random Virtual
Portfolio 1 4
Random Virtual
Portfolio 1 9
Random Virtual
Portfolio 1
Random Virtual
Portfolio 1
Random Virtual
Portfolio 1
Random Virtual
Portfolio 10

63. Perform Stepwise Regression Analysis
Portfolios Rank =
iAi
Where
Ai = ith Attribute
i = Regression Coefficient (weight) of ith Attribute
Results in the minimal set of independent attributes contributing in the
judgment of stakeholders about the topic

64. Problem: Diagnosis of malignant tumors of breast
Positive Biopsy rate is 10%-31% for cancer
Total cost of percutaneous large core biopsy of a breast nodule is $1000
The total cost of excisional biopsy of a breast lump is between $3000 and $4500

65. Alternatives Magnetic Resonance Imaging Mammography Ultrasonography
Positron Emission Tomography

66. Attributes Sensitivity (SE) Specificity (SP)
Positive Predictive Value (PPV)
Negative Predictive Value (NPV)
Complexity of Interaction with Patients (CIP)
Includes time spent, degree of discomfort, Invasiveness
Complexity of Interaction with Doctors (CID)
Includes Time spent, Level of necessary training and experience, Complexity of protocol
Cost (C)

67. SE SP
PPV
NPV
CIP
CID C
MRI 96 69 75 97 9 5
500
Mammography 89 45 57 83 2
Ultrasonography 48 94 65 90 6
200
PET 80 73 41 4 7
350

68. Thank You !
Any Question ?