ɲɚɝ
0+
:
p
b
8
(
k
) =
m
b
(
m
)
N,
D
(
k
)
m
b
(
m
)
d
N,|
U
(
k
)
p
(
m
a
1)
8
(
k
)
,
ɲɚɝ
0,
:
p
b
9
(
k
) =
m
b
(
m
)
N,
U
(
k
)
m
b
(
m
)
d
N,|
D
(
k
)
p
(
m
a
1)
9
(
k
)
,
ɲɚɝ
0-
:
p
b
10
(
k
) =
m
b
(
m
)
N,
D
(
k
)
m
b
(
m
)
d
N,|
D
(
k
)
p
(
m
a
1)
10
(
k
)
,
ɲɚɝ
0.
:
E
b
(
m
)
N
(
k
) =
wE
b
(
m
)
N
(
k
a
1)+
m
b
(
m
)
N,
U
(
k
)
m
b
(
m
)
d
N,
U
(
k
)
¡
1
a
p
(
m
a
1)
1
(
k
)
¢
a
a
μm
b
(
m
)
N,
D
(
k
)
m
b
(
m
)
d
N,
D
(
k
)
¡
1 +
μp
(
m
a
1)
2
(
k
)
¢
+
+
m
b
(
m
)
N,|
U
(
k
)
m
b
(
m
)
d
N,|
U
(
k
)
¡
1
a
p
(
m
a
1)
3
(
k
)
¢
a
a
μm
b
(
m
)
N,|
D
(
k
)
m
b
(
m
)
d
N,|
D
(
k
)
¡
1 +
μp
(
m
a
1)
4
(
k
)
¢
+
μ
¡
p
b
5
(
k
) +
p
b
d
5
(
k
)
¢
+
+
μ
¡
p
b
6
(
k
) +
p
b
d
6
(
k
)
¢
a
¡
p
b
7
(
k
) +
p
b
d
7
(
k
)
¢
+
μ
¡
p
b
8
(
k
) +
p
b
d
8
(
k
)
¢
+
+
μ
¡
p
b
9
(
k
) +
p
b
d
9
(
k
)
¢
a
μ
2
¡
p
b
10
(
k
) +
p
b
d
10
(
k
)
¢
?h^ `il
m.
ɂɧɢɰɢɚɥɢɡɚɰɢɹ ɛɵɫɬɪɨɝɨ ɚɥɝɨɪɢɬɦɚ
,
ɨɫɭɳɟɫɬɜɥɹɟɬɫɹ ɫɥɟɞɭɸɳɢɦ
ɨɛɪɚɡɨɦ
4
N
(0) =
0
N
& ( ( ( &
N
(0
a
L
+ 1) =
0
N
&
|
N
(0) =
0
N
& ( ( ( &
|
N
(0
a
L
+ 1) =
0
N
&
d
(0) = 0
&( ( ( &
d
(0
a
L
+ 1) = 0
&
h
f
(
m
)
N
(0) =
0
N
&
h
b
(
m
)
N
(0) =
0
N
&
t
(
M
)
N,|
U
(1) =
0
N
&
t
(
M
)
N,|
D
(1) =
0
N
&
t
(
M
)
N,
U
(1) =
0
N
&
t
(
M
)
N,
D
(1) =
0
N
&
g
(
M
)
N,|
U
(1) =
0
N
&
g
(
M
)
N,|
D
(1) =
0
N
&
g
(
M
)
N,
U
(1) =
0
N
&
g
(
M
)
N,
D
(1) =
0
N
&
E
f
(
m
)
N
(0) =
p
2
&
E
b
(
m
)
N
(0) =
p
2
w
a
N
m
&
h
N
(0) =
0
N
&
p
(
M
)
1
(1) = 0
& ( ( ( &
p
(
M
)
10
(1) = 0
&
ɝɞɟ
h
f
(
m
)
N
&
h
b
(
m
)
N
ɢ
E
f
(
m
)
N
&
E
b
(
m
)
N
ɜɟɤɬɨɪɵ
ɜɟɫɨɜɵɯ ɤɨɷɮɮɢɰɢɟɧɬɨɜ ɢ ɷɧɟɪɝɢɢ ɨɲɢɛɨɤ ɮɢɥɶɬɪɨɜ ɩɪɹɦɨɝɨ ɢ ɨɛɪɚɬ
'
ɧɨɝɨ ɥɢɧɟɣɧɨɝɨ ɩɪɟɞɫɤɚɡɚɧɢɹ
U/& +,W(
Ɂɞɟɫɶ
f
ɢ
b
ɢɧɞɟɤɫɵ ɩɪɹɦɨɝɨ ɢ
ɨɛɪɚɬɧɨɝɨ ɥɢɧɟɣɧɨɝɨ ɩɪɟɞɫɤɚɡɚɧɢɹ
(
ȼ ɫɥɭɱɚɟ
M
'
ɤɚɧɚɥɶɧɨɝɨ ɚɞɚɩɬɢɜɧɨɝɨ ɮɢɥɶɬɪɚ ɛɵɫɬɪɨɟ ɜɵɱɢɫɥɟɧɢɟ
ɜɟɤɬɨɪɨɜ Ʉɚɥɦɚɧɚ ɨɫɭɳɟɫɬɜɥɹɟɬɫɹ ɜ ɬɟɱɟɧɢɟ
M
ɢɬɟɪɚɰɢɣ
"
ɧɚ ɤɚɠɞɨɣ
k
'
ɣ ɢɬɟɪɚɰɢɢ ɚɥɝɨɪɢɬɦɚ
&
ɫɦ
(
ɪɢɫ
( ,#(
ȼ ɷɬɢɯ ɜɵɱɢɫɥɟɧɢɹɯ ɭɱɚɫɬɜɭɸɬ
2
M
ɮɢɥɶɬɪɨɜ ɥɢɧɟɣɧɨɝɨ ɩɪɟɞɫɤɚɡɚɧɢɹ ɫ ɨɞɢɧɚɤɨɜɵɦ ɱɢɫɥɨɦ ɜɟɫɨɜɵɯ ɤɨɷɮ
'
ɮɢɰɢɟɧɬɨɜ
&
ɪɚɜɧɵɦ
N
(
ȼɟɤɬɨɪɵ ɜɯɨɞɧɵɯ ɫɢɝɧɚɥɨɜ ɷɬɢɯ ɮɢɥɶɬɪɨɜ ɨɩɪɟ
'
ɞɟɥɹɸɬɫɹ ɫɥɟɞɭɸɳɢɦ ɨɛɪɚɡɨɦ
U+*W4
(0)
N
(
k
) =
N
(
k
)
,
(1)
N
(
k
) =
h
x
ɬ
N
1
(
k
a
1)
,
x
ɬ
N
2
(
k
)
, . . . ,
x
ɬ
N
m
(
k
)
, . . . ,
x
ɬ
N
M
(
k
)
i
ɬ
,
( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( (
(
m
)
N
(
k
) =
h
x
ɬ
N
1
(
k
a
1)
,
x
ɬ
N
2
(
k
a
1)
, . . . ,
x
ɬ
N
m
(
k
a
1)
,
x
ɬ
N
m
+1
(
k
)
, . . . ,
x
ɬ
N
M
(
k
)
i
ɬ
,
( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( (
(
M
)
N
(
k
) =
h
x
ɬ
N
1
(
k
a
1)
,
x
ɬ
N
2
(
k
a
1)
, . . . ,
x
ɬ
N
m
(
k
a
1)
, . . . ,
x
ɬ
N
M
(
k
a
1)
i
ɬ
.
3. CMMH *,-0'-3--(
ȼɟɫɬɧɢɤ ɆȽɌɍ ɢɦ
(
ɇ
(
ɗ
(
Ȼɚɭɦɚɧɚ
(
ɋɟɪ
(
ɉɪɢɛɨɪɨɫɬɪɨɟɧɢɟ
( ,**/(
ʋ
+
