Ngày tải lên :
16/08/2014, 02:12
... (A2 (x∗ )), J2 (y2,n )) 2 F2 (y2,n , A2 (x∗ )) ≤ c2 G2 (y2,n , A2 (x∗ )) (2. 42) Trong F2 (y2,n , A2 (x∗ )) = max 2 (y2,n , J2 (y2,n )) max {ρl (C2l (y2,n ), C3l (A2 (x∗ )))}, l∈{1, ,5}\ {2, 3} ... ,5}\ {2, 3} 2 (y2,n , y2,n+1 )ρ3 (A2 (x∗ ), J3 (A2 (x∗ ))), 2 2 (y2,n , C 32 (A2 (x∗ )))ρ3 (A2 (x∗ ), A3 (y2,n )) 2 Và G2 (y2,n , A2 (x∗ )) = max{ 2 (y2,n , C 32 (A2 (x∗ ))), 2 (y2,n , y2,n+1 ), 2 ρ3 ... max{ 2 (y2,n , C3 ,2 (y3,n−1 )), 2 (y2,n , J2 (y2,n )), (2. 26) ρ3 (A2 (y2,n ), J3 (y3,n−1 ))} = max{ 2 (y2,n , y2,n )), 2 (y2,n , y2,n+1 ), ρ3 (y3,n , y3,n )} = 2 (y2,n , y2,n+1 ) Thế (2. 25) (2. 26)...