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Engineering Education Methodology on Intelligent Control (Fuzzy Logic and Fuzzy Control) M.Yamakita Dept. of Mechanical and Control Systems Eng. – PowerPoint PPT presentation

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Title: M.Yamakita


1
Engineering Education Methodologyon Intelligent
Control(Fuzzy Logic and Fuzzy Control)
  • M.Yamakita
  • Dept. of Mechanical and Control Systems Eng.
  • Tokyo Inst. Of Tech.

2
Natural Reasoning
IF he/she is Tall, THEN his/her foot is Big. IF
his/her foot is Big, THEN his/her shoes are
Expensive.
IF he is Tall, THEN his shoes are Expensive.
IF he/she is Tall, THEN his/her foot is Big. Mr.
Smith is Tall.

Mr. Smiths foot is Big.
3
  • Crisp Expert System

Inference (Reasoning)
Formal Logic
A ? B
A ? B B ? C
IF A THEN B A is true
IF A THEN B
A
IF B THEN C
A ? C
B
B is true
IF A THEN C
Modus Ponens
Hypothetical Syllogism
4
Crisp Logic
Tall

Mr.A
181cm
(
170cm

(
Mrs.B
177cm
Short
(
5
IF he is Tall, THEN his foot is Big.
Mrs. B is Tall.
Mrs. Bs foot is Big.

Mr. A is Very-Tall.
Mr.As foot is Very-Big.
Mr. A is Very-Tall.
Natural Reasoning
6
Fuzzy Logic (Fuzzy Inference)
B
A
A ? B
B is true
A ? B A
A ? B B ? C
B
IF A THEN B
B ? C
IF B THEN C
B
IF A THEN C
A ? C
A ? C
7
How To Realize Fuzzy Inference ?
Introduction of membership function !
We consider a member of a set as well as the
degree of the membership.
Degree of property
100
50
30
)
x
170
190
180
Height
Tall
Very Tall
8
Representation of Fuzzy Set
1.Countable Set
2. Uncountable Set
9
Example
1. Countable Case
Membership Function
1.0
0.5
x
170
190
180
Height
Tall
Very Tall
10
1. Uncountable Case
Membership Function
1.0
0.5
x
170
190
180
Height
Tall
Very Tall
11
Fuzzy Set Operations
1. Implication
2. Union
3. Intersection
4. Compliment
12
Fuzzy Relation
Definition
Fuzzy Relation
Let assume that X and Y are sets. Fuzzy relation
R of X and Y is a fuzzy subset of X x Y as
fuzzy relation R of
is
In general,
13
Composition of Relations
Definition Composition of Fuzzy Relations
Let R and S are fuzzy relations, i.e.,
Composition of fuzzy relations, R and S, is a
fuzzy set defined by
R
S
X
Z
Y
is
If A is a fuzzy set and R is a fuzzy relation,
14
Fuzzy Inference
Direct Method (Mamdani)
(Max-Min Composition)
Caution! A and B are Fuzzy Sets.
15
ATall BBig AVery Tall
If he/she is tall then his/her foot is big. He is
very tall.
If he/she is tall then his/her foot is big. He is
178cm tall.
ATall BBig A178 B is still Fuzzy Set
A is not fuzzy set or Defuzzy value
16
Fuzzy Control
Rules
C
B
A


is

z
then

is
y

and


is
x
If

1

Rule
1
1
1
C
B
A


is

z
then

is
y

and


is
x
If

2

Rule
2
2
2
.




.



C
B
A

n
n
n
Input

is

x
Output
17
Defuzzication
Control Input is Number
Defuzzication
If x and y are defuzzy values,
This operation is sometimes replaced by x
(multiplication)
18
Triangular Membership Function
Example
If x is NS, and y is PS, then z is PS If x is ZO,
and y is ZO, then z is ZO
R1
R2
NS
R1
PS
ZO
ZO
ZO
R2
19
Simplification
NS
R1
PS
ZO
ZO
ZO
R2
Further Simplification (Height Method)
NS
PS
R1
PS
ZO
ZO
ZO
R2
20
TS(Takegaki-Sugeno)Model
  1. Singleton Fuzzifier
  2. Product Inference
  3. Weighted Average Deffuzifier

PM
PS
R3
PS
PS
PS
R4
21
References
  1. S.Murakami Fuzzy Control , Vol. 22, Computer and
    Applications Mook, Corona Pub.(1988) in Japanese
  2. K.Hirota Fuzzy !?, Inter AI (Aug,88-June,90) in
    Japanese
  3. S.S.Farinwata et. Ed. Fuzzy Control, Wiley (2000)
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