Engineering Optimization: Theory and Practice, Fourth Edition

8.4 Solution Using Differential Calculus 495

Equations (8.7) are called theorthogonality conditions and Eq. (8.9) is called the
normality condition. To obtain the minimum value of the objective functionf∗, the
following procedure can be adopted. Consider

f∗= (f∗)^1 = (f∗)

N

j= 1 

∗

j=(f∗)∗ (^1) (f∗)∗ (^2) ·· ·(f∗)∗N (8.10)
Since
f∗=

U 1 ∗

∗ 1

=

U 2 ∗

∗ 2

= · · · =

UN∗

∗N

(8.11)

from Eq. (8.8), Eq. (8.10) can be rewritten as

f∗=

(

U 1 ∗

∗ 1

)∗ 1 (

U 2 ∗

∗ 2

)∗ 2

·· ·

(

UN∗

∗N

)∗N

(8.12)

By substituting the relation

Uj∗=cj

∏n

i= 1

(xi∗)aij, j= 1 , 2 ,... , N

Eq. (8.12) becomes

f∗=







(

c 1

∗ 1

)∗

1

[n

∏

i= 1

(x∗i)ai^1

]∗

1













(

c 2

∗ 2

)∗

2

[n

∏

i= 1

(xi∗)ai^2

]∗

2







·· ·







(

cN

∗N

)∗N[∏n

i= 1

(xi∗)aiN

]∗N



=







∏N

j= 1

(

cj

∗j

)∗j











∏N

j= 1

[n

∏

i= 1

(x∗i)aij

]∗j





=







∏N

j= 1

(

cj

∗j

)∗j





[n

∏

i= 1

(xi∗)

∑N

j= 1 aij∗j

]

=

∏N

j= 1

(

cj

∗j

)∗j

(8.13)

since
∑N

j= 1

aij∗j= 0 for anyi from Eq. (8.7)

Thus the optimal objective functionf∗can be found from Eq. (8.13) once∗j are
determined. To determine∗j ( j= 1 , 2 ,... , N), Eqs. (8.7) and (8.9) can be used. It
can be seen that there aren+1 equations inNunknowns. IfN=n+1, there will
be as many linear simultaneous equations as there are unknowns and we can find a
unique solution.