, .
() | W = = ׃ | q0 q1 - 0 1 - | |
IW = ׃ = = | ∑q1p0 ∑q0p0 - ; ∑1 ∑0 . | , , . | |
( ) ( ) | it = = ׃ It = | t0 t1 , . ∑t0q1 ; ∑t1q1 . | . |
..:
IW = =
: , , , ..
() . :
1. , ;
2. ( ) ( ).
( ).
: | I = = = : = = : = = | W1 W0 - 1 0 - | : 1. , ; 2. |
: | Iw = : = | " - " - " | , |
: | I = : = | " - " - " | . |
: | I = Iw * Icmp | " - " - " |
:
|
|
:
) :
W) =
) :
:
=