Модели импульсных нейронов (90
..pdf
|
|
|
|
|
|
|
|
|
|
|
! |
" #$ %& #%%' ( 60 × 84/16 |
|
*+-),#*+&))! |
|
10+%. |
|
)2 ), |
|
5)3 , ) |
|
!2 |
|
6) |
|
75" |
|
8-*)) ) *+%%%%*- |
|
|
|
|
|
|
|
#! " |
|
"#! ( ) ")"( ""% " )+*)
0/.-, ( )
( ) 1 . / , ( ) 2 "% " ( 3 ) * + ) 4 "% % 0 +- 55 4 66 "
3!%)8" )"( )7 )8 " ) |
||
) (% "% ! |
3--# 0! |
|
%- (8) :( h3 " ) " |
) 3 |
|
)""% ( ") 2"( ))) % |
||
)") ) )") )8 " |
||
) (% ")" %% |
|
|
* 8 |
" ) % 3(8 :)!"-" (% |
|
3)) )))* ) %5 5 5" ) |
||
< )" )3) )))* ) %5 5 55% ) |
||
=> #%) |
-# ?%)) (% " #"" ) |
|
(8 )8 #-@* A% 5) %) 0
B |
#"( ""% " )# |
|
55-)+*)( ) ") |
|
|
>=<;%:-9 ###=-'?-*
8$
|
|
|||
:-9 |
"! |
# |
#"<! |
! |
|
-8+=#%%%) *>=% &'$! |
|
||
('9#: |
|
) *) 3 6@2 |
||
|
! ,)6! 6@ |
|||
< ( ' ! ) $ ' $ ! *&
<< (; = -''8 = A -&8 = B-% = C -%8-D-%?-
3./012-,9$: |
UMUVQHIMSTNMOPQKRJKSIFGHIJKJHJKLME |
MXPKJHJKSIHINPSINGPJKSIJSHRRWKPHJKSIKJOHINPGQQMIJ |
|
3<IMQLMKI |
_]^SINSIZ[\OKSWY<<,456783./012-, |
= -'+# = B--? = Z +%%D+88
98:: ( ) < : = >
$'+='&&-*
<=!<); 6=!<9+: |
|
#+-='&+-*>= |
|
(:<2(:9&: |
|
=#!":)$! |
|
#%%$` *> |
|
)<9?: |
,6@! )2 a |
)< |
8%&='?+-; *>=< |
?>9b: |
,!! 3 ) ,)! |
,)) a @*6@ |
|
$ '"">!?< |
|
=A +=''$-=)<< |
|
$D#+-C=#-B |
|
#::<)2 6:9': |
|
$+%='?&-*>= |
|
|
8# |
|
|
*)1 |
, |
) ,=) ) *6* |
|
) 1011 * ) |
|
6 ) ) 1015 |
2 |
6 6 @ ,
%- * )
6c )a ) ,
)
) 3 % +D# < 9-: ( 3 * 6 ) 6 * )
a 6 @ ,
3 @ 6@
) @
! 3 * @ * *
* * c * 6c) ,
. 6@ ) ,
6@ ) @ ) @
9#:
,6)) 6)1 |
||
,a*)) 66 |
||
,) 6) c6)))0 |
||
)) *)) |
||
; ,)) |
||
)33) |
d , |
|
|
) ,6)@9$:d ) |
|
6 @)) |
||
,)) c!! 3 ) 6@ |
||
)d Dd )) |
||
))) |
|
|
,)*)) |
||
,!! 3 )6 * |
||
|
$ |
|
,6*6 a |
|
3a3 6*6 |
|
@6** |
|
,3 )a)) |
|
*) c |
a |
,*66)0; |
|
! 3@*c6 |
|
,) *6@3* |
|
) |
|
@@6@ |
|
! ,@*) |
|
,)3 * |
|
|
|
@) 3 |
|
>_]#b)0 |
|
u˙ = λ a − fN1 a (u) fN2 a (u(t − 1)) − gl u + ul0. |
_]#' |
,) 66 ,!! 3 ) 6@6*) @6 a@ 63 )) 66 6 )@ ) ) *@" ,*(; )) ,;) )66a ,]6 @ )*)_ ) ,*)
c 2 ,
) @ 6@ ) ,
) 0) 6@
@) 6a @*
8 |
-8 |
,336c6@) |
|||||
3 6@ ) ) 0!! 3 χN a |
, |
||||
,) a) |
|||||
3 ) > |
|
|
|
|
|
χN a = a − fN1 a (u (t)) fN2 a u(t − hN2 |
a) , |
_]#& |
|||
3 *36)6 |
|||||
= 6 a h2 |
|
|
|||
|
|
|
N a 3 , |
||
! 3) ) 6_]#&)6@3 |
|||||
fN1 a(u) , fN2 a (u) → 0 u → ∞ |
|
|
|
||
) >*)6 |
|||||
χK = −(b − fK (u(t − hK ))) , |
|
_]#? |
|||
) ) ! 3 fK (u) → 0 u → ∞ |
|
||||
,_]#$_D]#?_]#8" ) |
|||||
>* |
|
|
|
||
u˙ = |
λ a − fN1 a(u) fN2 a (u(t − 1)) |
|
_]#b |
||
|
|
|
|
|
|
− b − fK (u(t − hK0 )) − gl u + ul0, |
|
||||
|
|
|
|
|
|
λ >> 1* h0 |
|
|
|
|
|
|
K = 6 ) , |
||||
* ul0 |
3 ) ul , |
||||
a * f 2 |
(0) = 1 7) , |
||||
|
|
N a |
|
|
|
6 ) h0 |
= 1 ; @ |
||||
K |
|
|
|
|
|
>_]#b |
|
|
|
|
|
a fN2 a (0) |
− (b − fK (0)) − gl > 0. |
|
|||
D *6_]#b |
|||||
6* |
|||||
,9&:62 *`@ |
|||||
)6) 6@ |
|||||
|
|
8% |
|
|
|
3);
3 ) ] )_* ) c ) )
@ 6@ ]_ ,
) * 6 6 . , ) ) * , ) a @ c 0) ) ) c
c @ 6 0) , ) ) c ` ,
3 ) c @ ,
6 ] 6 3 )_ ) @ ,
) . * , @ ) 3 ] 6 3 )
3 )_* 0 ) ) 6 ,
) 6 6 6 " ) ,
@ ) c @ 3 6 ,
3 ) ) * ,
* 6 6 *
6 6 ) 6 ) ]_
6 3 ) 6 *
6 * c *
) " ) ) *
@ ! "
6 3 ) ) ) ,
3 6 @ 6@ ,
* ) ) 0
) ` 6 * ,
)) * +:98*6 6,6) 3@ ,9+:ee)c6) )3 )) a*
+
,6@,)6* ,; 6) )6) 66a *)) 66) )6 _] 63 6) c6 a ) ,) *))); 6 ,),7a @ ,) a3 * 9&:3 )6@a
` 3 ) * , c ) )* 3 3 K+ )
6c * ) ) 0 6 K+ !! ) 2 ) 6
,) *) ) 6@! 3 .3 )6@
6 3 ) ) 6 0) , @ 3 ) ) K+
) )*c7 ) *,6
3 ,
) @ * * ) @) ,
) ) ) ) 6@
) 3 ) * ,
a ) * * ) ) ) ,
6@ 6* @ . 6
6) f 3
) 6 0) ,
) 3 3 ) ,
) 6 ) ] ) @ 3 ,
3 * @ 6 ,
3 ) c c_ " ) 6
3 ) 6 )
3 ,))a ,3 )63
! " $
! h$
6) 3) c" |
|||||||
_) 3] |
" ) ,) |
||||||
03 ))) |
|||||||
u |
,*) |
||||||
>c*a @ |
|
||||||
|
cu˙ = IN a + IK + Il. |
_]#$ |
|||||
1 |
Il = gl (ul − u) , |
|
|||||
|
_]#8 |
||||||
ul , 6 0) @ 3 ) |
|||||||
* gl , |
|
|
|
|
|
|
|
6" |
IN a |
) 6 IK |
) , |
||||
>a |
|
|
|
|
|
|
|
|
IN a = χN au, |
|
|
IK = χK u. |
_]#+ |
||
1 0!! 3 6 χN a |
|
|
χK a ! 3 u |
||||
" ) ) IK 6 6 ) * ) , |
|||||||
,3 ) |
|||||||
7))))) 3 |
|||||||
IN a * ) a* ) ) |
|||||||
>6 |
IN a = χ |
(uN a |
− |
u)* uN a , |
|
||
|
N a |
|
|
|
|
||
) ) ,])3 ) |
|||||||
_) |
0!,6@)2 |
||||||
! 3 χN a |
) ) ! 3 u ) |
||||||
_9+:66 *])* |
*6 |
||||||
) @ ) ) 3 6 ]u = , |
|||||||
)_ 0!! 3 χN a ) " 0 6 ) * |
|||||||
χN a = χN au |
_]#$))) |
||||||
& |
$' |
) a*
u0(s) = ϕ0(s) s [−1, 0], ϕ0(s) S;
ui(s) = u s [−1, 0], i = 1, . . . , N ; vi(0) = u , i = 1, . . . , N.
t > 0 |
|
! (11)" |
|
$ % ! (21)" |
|
& |
|
ui(t) ≈ u0(t − iτ ) t > iτ, |
i = 1, . . . , N ; |
|
|
&$ |
|
vi(t) ≈ v1(t − (i − 1)τ ) t > (i − 1)τ, i = 2, . . . , N. |
|
@ ,)*. |
|
` 3 @ ,
) ) ]_ ) ,
@ ) @
3 * ) @ ,
) @ ) @ ,
) ) * a 6,
@ " ,
@ @ @ ) 6* ,
a * 6 c
)
" ) 6 ) 6 ) ,
) 6
$b
c ) 0) @ ,3 ) ) N a+ ) c ,
,)63 6) *)
) * @ 3 3 6c 6 )
) ) ) 6 @
6 3 ) , ) , 6 3 )
3 ) 6 @ )* 6
) . a ) 6
3 3 ) 6* ) 3 )
) ) ] 3 ,
3 ) _ ,
) 0 ; )
) 6 ,
@ 6* a ) a
6c 3 3 * , 6 6 ]_ 9&* +* ?: 2
) 0 * )
) )
6626; ) |
|
N a+ |
) 6 K+ |
) ,)3) |
|
6 @ K+ c |
|
N a+ |
) ] ) ) 6 6 K+* 6 |
N a+ |
,)_6) |
,@]3 )3 )6 |
|
6,6*_3 )6 |
|
,)6*0)) |
|
; 6) ) 6 |
|
6; *) |
|
@) ) 6) |
|
3a |
|
|
? |
) ,@ *) 6@,; 6 |
|||
6) |
|||
|
c 3 3 K+ |
||
c ** |
|||
) * 3 3 N a+ |
|||
" 3 |
3 |
) ) |
|
d |
) *)9$:d ) |
||
]6 |
|||
0))3 3 |
|||
7)3 !_) |
|||
f@ |
d 6 |
6 ,6)d ) |
|
6@3 ) 6@) |
|||
)) a @) * |
|||
3 ,)) )" |
|||
3 )]3 )) |
|||
*_))c |
|||
6 )6 ) N a+* a 0 6 |
|||
) 6 N a+ , |
|||
,)) *0)) |
|||
] ,) 6@))63 3c |
|||
) 6@_ ! ) * a @ 6 N a+ , |
|||
,a@ 6*@)3 6@ |
|||
"6) *66 |
|||
,) 6)] c) 3 |
|||
,3 66_3 ) |
|||
6 6 m |
)h)6@), |
||
) * ) c m , 6 * |
|||
" 3) 3) |
|||
)6 |
|||
,) 3) ))" |
|||
6 ,1 6)66 |
|||
6 h , * 6 ) )6 |
|||
- ) 6 m |
,('b%-, |
||
]ui(t) = u + o(1)_ |
6 |
||
) ) >! * |
|||
|
TR = α1 + 2 + o(1). |
||
,66 |
|||
,)2@6 |
|||
) ,%:*-96 )) |
|||
)) 6) |
|||
i ,) 6@ 66*) c |
|||
j |
|
|
|
*)! )6@ |
|||
v1(t) ≈ u0(t) 0 < t < t , |
|||
v1(t) ≈ u1(t) t > t . |
|||
)3 )66 *. |
|||
|
|||
|
t1 |
|
= 1 + o(1), |
|
max |
|
|
|
t2 |
= 1 + τ + o(1) |
|
|
max |
|
|
) )@ a |
|||
|
tmin = t + o(1). |
||
%:-96)) |
|||
,6c *6) 6` * |
|||
*6 |
iD @ ` |
||
t |
= iτ + o(1)* 6 3 ) |
||
iD ) ) 63 )
vi(t) ≈ v1(t − (i − 1)τ ) t > (i − 1)τ.
b |
$? |
>); |
|
v1(t) ≈ u1(t) ( o(1)). |
|
,*) 6" ) |
|
)) 66) c* |
|
`@ 66)) |
|
,6) ) *6*. |
|
! ))@)3 ) |
(11) |
6 3 ) @ t > τ |
, |
) ! ) > u1(t) ≈ u0(t − τ ) ( o(1)).
,3 )6a( )6* >*)
eλα1(t+o(1)),
eλ(α1−(t−1)+o(1)),
eλα1(t−τ +o(1)),
eλ(α1−(t−1−τ )+o(1)),
v1(t) =
e−λα2(t−1−α1−τ +o(1)),
ε + o(1)
,
λα
t[δ, 1 − δ],
t[1 + δ, t − δ],
t[t + δ, 1 + τ − δ],
t[1 + τ + δ,
1+ α1 + τ − δ],
t[1 + α1 + τ + δ,
2 + α1 − δ],
t > 2 + α1 + δ.
(21)
*6)` ) 6 |
) |
6@ |
t > 0* , |
6 = t > τ " 0 ) 6 , |
|
,` *@) |
|
)* |
|
@* |
|
$& |
|
; ) 6
6 )6 2 ) * ,
i ) j* 6 *
) ) - 6 ,
6 )6 ) ) )6 ) *
) 6 ) 6 ) 6
6 3 ) ) , c 6@ ) * 6 ,
h , * 6 |
|||||||
,@a3 ) |
|||||||
)k |
d |
,d ) |
|||||
c66) * |
|||||||
,6) 6) |
|||||||
*)) |
) |
||||||
6065)6) 6 |
|||||||
6 6@ n , 6 ) ) |
|||||||
0"_] 63 3c |
|||||||
_) )3 )] 6c |
|||||||
)a ) |
|||||||
] ,)) 6)0) |
|||||||
) ) 6_6@ |
|||||||
) |
|
|
|
||||
)) *6@)* |
|||||||
3 6@)) 6@ |
3 , |
||||||
6 n , 6 * , |
|||||||
_] )3 )a |
|||||||
2 ) |
|
g¯l |
) |
|
|
||
d |
,) )d ) |
||||||
> g¯l = gl = Const ) ) 3 |
|||||||
)6)3 )3 |
|||||||
6 @ |
|
|
|
|
|
||
@" |
,)0) @, |
||||||
'
) 6@ > iC + iN a + iK + il = 0.
6 6 m (t) h (t) 3 3 ,
6@ ) ; 3* ,n (t) D 3 ) 6@ )
) ad ),d >
c |
d V |
= gN am3h (VN a − V ) + gK n4 (VK − V ) + gl (Vl − V ) , |
|||||||||
|
|||||||||||
d t |
|||||||||||
|
|
|
|
|
|
|
|
|
|
|
_-] |
|
|
|
d m |
= |
m∞ (V ) − m |
, |
_]# |
||||
|
|
|
|
|
|
||||||
|
|
|
d t |
|
|
τm (V ) |
|
|
|
||
|
|
|
|
d h |
= |
h∞ (V ) − h |
, |
|
_]$ |
||
|
|
|
|
|
|
|
|||||
|
|
|
|
d t |
|
|
τh (V ) |
|
|
|
|
|
|
|
|
d n |
= |
n∞ (V ) − n |
, |
|
_]8 |
||
|
|
|
|
|
|
|
|||||
|
|
|
|
d t |
|
|
τn (V ) |
|
|
|
|
* * VN a = 112* VK = −12* Vl = 10 ]#_D |
|||||||||||
]8_ ! 3 m∞ (V )* h∞ (V )* n∞ (V )* |
τm (V )* τh (V )* τn (V ) |
||||||||||
( 36 6) ) 6 |
m∞ (V )* h∞ (V )* |
||||||||||
n∞ (V ) |
6@6 6@) |
) a)6! 3 * |
||
> |
m∞ (V ) → 1* h∞ (V ) → 0* n∞ (V ) → 1 |
|
V → ∞ |
|
m∞ (V ) → 0* h∞ (V ) → 1* n∞ (V ) → 0 |
V → |
−∞ l * ]#_D]8_ 6 |
|
m(t), h(t), n(t) (0, 1)* |
|
60 |
6 ) |
|
|
|
|
@ |
d |
,d ) |
||
@ a @6 |
|
6! 3 *_D]8_]# |
||
|
|
|
%- |
|
- |
u0(t) > u1(t)* |
|
|
|
|
|
|
# |
u0(t) < u1(t) |
|
|
|
|
|
|
) 6 > u0(t) > u1(t) > |
|
||||||
|
eλ(α1−(t−1)+o(1)) > eλα1(t−τ +o(1)); |
|
|||||
|
α1 − (t − 1) + o(1) > α1(t − τ + o(1)), |
|
|||||
|
|
|
|
|
α1τ |
|
|
|
t < 1 + |
|
|
+ o(1). |
|
||
|
α1 + 1 |
|
|||||
|
|
α1 |
τ |
|
|||
2 t = 1 + |
|
* * 1 < t |
< 1 + τ |
||||
α1 + 1 |
|||||||
` t [1+δ, t −δ] ]#%_ |
|||||||
>) ac |
|
||||||
|
v˙1 = −2λv1 + λeλ(α1−(t−1)+o(1)), |
|
|||||
|
v1(1) = eλα1(1+o(1)). |
|
|||||
c > |
|
|
|
|
|
||
|
v1(t) = eλ(α1−(t−1)+o(1)). |
|
|||||
>)" ) ) |
|
||||||
|
v1(t) ≈ u0(t) |
( o(1)). |
|
||||
) > u0(t) < u1(t) |
|
||||||
|
t [t + δ, 1 + τ − δ]. |
|
|||||
>_]#%1 |
|
||||||
|
v˙1 = −2λv1 + λeλα1(t−τ +o(1)), |
|
|||||
|
v1(t ) = eλ(α1−(t −1)+o(1)). |
|
|||||
c > |
|
|
|
|
|
||
|
v1(t) = eλα1(t−τ +o(1)). |
|
|||||
|
|
|
$+ |
|
|
||