Employment of the “Intersection” Multi

Fotoenergetikada nanostrukturali yarimo‘tkazgich materiallar

II xalqaro ilmiy anjumani 
 
19-20 noyabr 2021 yil 
103 
Furthermore, the summation of each 
P
ij
for the index 
i
in 
j
th
material factor is 
normalized equaling to 1 according to the general principle of probability theory 
[4], i.e., 
1
1
n
ij
i
P



, which naturally results in 
.
(2) 
j
X
is the arithmetic mean value of the material performance indicator in the 
material group involved.
Equivalently, the partial favorable probability of the unbeneficial (cost) material 
property indicator 
X
ij
is negatively correlative to its material property indicator 
linearly, i.e. 
max
min
max
min
(
),
1, 2, ..., 
=1, 2, ..., .
(
),
ij
j
j
ij
ij
j
j
j
ij
P
X
X
X
i
n; j
m
P
X
X
X








(3) 
In Eq. (3), 
X
j
max
and 
X
j
min
represent the maximum and minimum values of the 
material property indicator 
X
j
in the material group, respectively; Furthermore, the 
normalized factor of the 
j
th
material performance indicator

j
is
max
min
1
(
)
j
j
j
j
n X
X
n X








. 
(4) 
Moreover, according to basic probability theory [4], the total / comprehensive 
favorable probability of the
i
th
candidate material is the product of its partial 
favorable probability of each material property indicator 
P
ij 
in the overall selection, 
i.e.,
1
2
1
m
i
i
i
im
ij
j
P
P
P
P
P






. 
(5) 
The total favourable probability of a candidate is the unique decisive index in 
the overall selection process competitively. The main characteristic of the new
 
"intersection" method for MOO is that the treatment for both beneficial property 
index and unbeneficial property index is equivalent and conformable without any 
artificial factors or subjective scaling factor. 
The partial favorable probabilities of the indices of 
E
0.5
,
 

and 

e
and 

f
 
/
E
and 
the total favorable probabilities are assessed according the Equations (1) through 
(5), respectively, which are shown in Table 2. In addition, the ranking here by 
using the new multi – object optimization method is given in Table 2 together with 
those of Vikor and Topsis from for comparison [1]. 
It can be seen from Table 2 that the appropriate material from the new multi – 
object optimization method is Cu, which is different from those of Vikor and 
Topsis from [1], this is because of the inherent defects of impersonal and 
subjective factors in Vikor and Topsis [4]. 

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