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L'ouvrage complet est disponible auprès des Éditions de l'École Polytechnique Cliquez ici pour accéder au site des Éditions
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E U IQ
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N H EC
( %' " " % # ! * 8 " 9 " " ∂ ∂ + ∂Y " ' " & " ( ∂X ∂ ∂ ∂ ∂ − " (' " & " ∂X − ∂Y • ∂X ∂Y 2
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u(tn , xj+1 ) − u(tn , xj−1 ) 2u(tn+1 , xj ) − u(tn , xj+1 ) − u(tn , xj−1 ) +V = 2∆t 2∆x (∆x)2 (∆x)4 (V ∆t)2 2 . ; $< (ut + V ux ) (tn , xj ) − (t , x ) + O (∆x) + u 1− xx n j 2∆t (∆x)2 ∆t ' , O (∆x)2 /∆t A ,
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8 $ % " : 7 $
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j=0
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LE O ÉC
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T Y POL
N H EC
E U IQ
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) N = 2( 0 < α < 1/2(
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un (x) = | log(|x|2 + n−1 )|α/2 − | log(1 + n−1 )|α/2 .
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+ Γ
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p = 2 Lp (Ω) B' % *' #C! v(x) ∂φ (x) dx ≤ Cφ p L (Ω) ∂xi Ω
%
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LE O ÉC
$
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LM 5 " m A 8 H m (Ω) A ,6?6 .0 ; : , . 5 " ? 8 v ∈ H m (Ω) ? . ∂ α v ∈ H m−|α| (Ω) 0 P v(x) = v(x , −xN ) xN < 0. $ % " 1 ≤ i ≤ N − 1 ∂v (x , xN ) xN > 0 ∂P v ∂x (x) = ∂v ∂xi (x , −xN ) xN < 0, ∂x " ∂v (x , xN ) xN > 0 ∂x ∂P v (x) = ∂v ∂xN − ∂x (x , −xN ) xN < 0. 5 % v * ; " v %' " *' 4
*! " ; *
L P v M % FC/H ! $ √ P % C = 2 Ω = RN + ! 1 Ω % ' C 1
8 9 Ω = RN+ 0 . C/ % 1
O P E L ÉCO 2
N
1
N
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(ωi )0≤i≤I
(θi )0≤i≤I
Cc∞ (RN )
θi ∈ Cc∞ (ωi ),
0 ≤ θi (x) ≤ 1,
I
θi (x) = 1
Ω.
i=0
Pv
Pv =
I
Pi (θi v),
i=0
: (" Pi ωi 5
θ0 v & Ω P0 (θ0 v)
θ0 v E ( Ω (" i ∈ {1, ..., I} φi " * ωi * Q % . C/ J ##!
+) wi = (θi v) ◦ ( φ−1 i Q
% Q+ = Q ∩ RN+ .
E U IQ
5 * wi & H 1 (Q+) % ∂Q+ ∩ RN+ 1 RN+ \ Q+ ' * w˜i ∈ H 1 (RN+ ) $ L w˜i ' * P w˜i ∈ H 1 (RN ) P " % RN+ ! $ % ωi
Y L O P
Pi (θi v) = (P w ˜ i ) ◦ φi .
H C E T
N
C 1 φi % ' Pi P
LE O ÉC
$
E U #
8 9 " IQ ' 5
E N H (" % " * C E T 1 H(div)LY O P 4
* E & % L % 5 % O A " //! C É •
L2 (Ω)
H 1 (Ω)
H(div) &
H(div) = σ ∈ L2 (Ω)N
divσ ∈ L2 (Ω)
#C!
,
% divσ σ ' & #(
E U IQ
$ % * " B'
!
' )
T Y POL
σ, τ =
E L O
! σH(div) =
ÉC
N H EC
##!
(σ(x) · τ (x) + divσ(x)divτ (x)) dx
Ω
σ, σ
H(div) *
5
1 ' % * " &
D( #C/!
%& " Ω C Ω = R Cc∞ (Ω)N
1
H(div)
N +
, H(div) " (
* O % " 1 ' % H 1 (Ω) 0 + σ & H(div) 8 ':1)*+) )1 &!5*'+'1% &): :,-51',*: / 9'*'9':)*1 5*) %*)0(') , . ) 0 30,30'%1%: ;5.-'1.1'2): . ; A 0
f ∈ L2 (Ω) u ∈ H01 (Ω) 2 L (Ω) H 1 (Ω) 2 f ∈ L (Ω)
N
;"
)0+'+) CC ) Ω RN G $ $ %
T Y POL
$ $ E
E L O
V · ∇u − ∆u = f u=0
Ω ∂Ω
;"
)0+'+) CC %: % $' !22 " v ∈ H01 (Ω) vV · ∇v dx = 0. Ω
" E H01 (Ω) $ * 1 J(v) = 2
|∇v|2 + vV · ∇v dx −
Ω
f v dx. Ω
E U IQ
L M 5 " # , , .
H C E T
N
>)0+'+) CC + !
$ Ω : + $%: xN = 0 B f f (x , xN ) = f (x , −xN ) " ! B : " ! + Ω+ = Ω ∩ {xN > 0} > Ω ∩ {xN = 0}
LE O ÉC
Y L O P
"
-
N H EC
E U IQ
)9.0;5) CC N , . 0 f ;"< 6
? L2 (Ω)A .0 f ∈ H −1 (Ω) ; L8 M )0+'+) CC Ω * C 1 G $
$ % $ $
7
T Y POL
LE O ÉC
−∆u = f ∂u ∂n + u = g
Ω ∂Ω
;"
)0+'+) CC Ω G $ $ % $ $ B ⎧ ⎨ −∆u = f Ω ∂u ;" < =0 ∂ΩN ⎩ ∂n u=0 ∂ΩD
N H EC
E U IQ
4 f ∈ L2 (Ω)( (∂ΩN , ∂ΩD ) ∂Ω ∂ΩN ∂ΩD 7* H C .
T Y POL
/ . . 0 ; I , , F ;"$ 0 Q ? , * @ 5 67 A , , 8 . ;" -'9'1): &) 10.*:9'::',* 6 . ( ' R (Ω1 , Ω2 )
Ω k(x)
T Y POL
k(x) = ki > 0 x ∈ Ωi , i = 1, 2.
LE O ÉC
;"
0
uH m+2 (Ω) ≤ Cf H m (Ω) .
Ω u ∈ H01 (Ω)
H m (Ω)
"
N H EC
E U IQ
* 5 " $ 5 " ; 8 H m (Ω) N/2' "$ -"$$ u ∈ H01 (Ω) =,9 " $ "$ " ))"$" C 2 (Ω), $ )" ' Ω " $ -" /$ RN C ∞ ' " f ∈ C ∞ (Ω)' "$ u ∈ H01 (Ω) =,9 " $ C ∞ (Ω),
,0,--.'0) CC
)9.0;5) CC 0 9 ∆uA 0 . uA ? 8 A 1,51): . u ? H V E GA . N = 1 [ . . , 8 . •
T Y POL
N H EC
E U IQ
)9.0;5) CC 5 " $ ' " & .0 /
? : . 0 ; 6 " )93-) &) :'*(5-.0'1%
H C E T
N
E U IQ
># :'*(5-'?0):A ,6?6 6 , , 0 . 56 " $ ' " & 8 9 A 0 , 8 0 ;,6?6 ? , 0. H 1 (Ω)< ,# 8 ;,6?6 8 .0< 0 /
LE O ÉC
Y L O P
"
$
Γ0
T Y L ΘP O Ω
ÉC
OLE Γ2
"
N H EC
E U IQ Ω
Γ2
Γ1
Θ Γ0
Γ1
W Ω , Θ ; π 0 , J #
LE O ÉC
" #
N H EC
E U IQ
µ > 0 (2µ + N λ) > 0 H 1 A
, B ; X A . " 6 < C > 0 |e(v)|2 dx ≥ C |∇v|2 dx
LE O ÉC
T Y POL Ω
Ω
v ∈ H01 (Ω)N 5 A , * ; A . * < C > 0 A v ∈ H01 (Ω)N A |v|2 dx ≤ C Ω
|∇v|2 dx. Ω
3 A ? . 2 2µ|e(v)| dx + λ|divv|2 dx ≥ Cv2H 1 (Ω) . Ω
Ω
E U IQ
5 67 , , 8 . ;""& 0 " ' ) " " $"$ v ∈ H 1 (Ω)N ' $
)99) CC $*%(.-'1% &) L,0*6 N
E U IQ
T Y POL
1/2 vH 1 (Ω) ≤ C v2L2 (Ω) + e(v)2L2 (Ω) .
E L O
;"$
)0+'+) CC ) Ω RN :
$ > !!/ ∂Ω "
$
f · (M x + b) dx + Ω
g · (M x + b) ds = 0 ∂Ω
E U IQ
∀b ∈ RN , ∀M = −M t ∈ RN ×N
N H EC
M $ $ $ H 1 (Ω)N $ + $ $ @ *A ( ! 2
E L O
T Y POL
)9.0;5) CC : 6 # 1 A , . # ; '
0 2µ + λ > 0
H C E T
N
E U IQ
>)0+'+) CC $ ! . !! λ µ "
Y L O P
! . !! λ µ *( B $ ! .
LE O ÉC
−div(µ∇u) − ∇((µ + λ)divu) = f Ω.
"
$
N H EC
E U IQ
1 A 30,/-?9) &5 +':.'--)9)*1 .*1'3-.*A # , ) 0 , ? , 0 ' 8 , , 00 ,0 ' 6 , .
LE O ÉC
T Y POL
>)0+'+) CC : $ $ : %* Ω * L > 0 ω ( 4 ω * RN −1 M λ µ G ( Ω = ω × (0, L)( x ∈ Ω( x = (x , xN ) 0 < xN < L x ∈ ω ⎧ −div (2µe(u) + λ tr(e(u)) Id) = 0 ⎪ ⎪ ⎨ σn = g =0 u ⎪ ⎪ ⎩ (σn) · n = 0
Ω ∂ω × (0, L) ω × {0, L} ω × {0, L}
N H EC
E U IQ
;"$
0 . D ;"&< , 0 D A 0 8 6 1 , D
T Y POL
N H EC
)9.0;5) CC 0 % ;"&< :'93-'@% , 6 , D . 0 ; )0+'+) CC
E U IQ
) = * ( - ) Ω = ω × (0, L) 4 L > 0 * ω ( * RN −1 - x ∈ Ω( x = (x , xN ) 0 < xN < L x ∈ ω
ÉC
T Y POL
⎧ ∇p − µ∆u = 0 ⎪ ⎪ ⎪ ⎪ ⎨ divu = 0 u=0 ⎪ ∂u ⎪ pn − µ ∂n = p0 n ⎪ ⎪ ⎩ ∂u pn − µ ∂n = pL n
E L O
N H EC
Ω Ω ∂ω × (0, L) ω × {0} ω × {L}
;"&
0 , ) / A , h → 0 , ;$ < L. M . 8 . ;$ 0 * V A v ∈ V u − v ≤ * A h0 > 0 ; < A v ∈ V A v − rh (v) ≤ ∀ h ≤ h0 . 9 . $ A
Y L O P
H C E T
N
E U IQ
u − uh ≤ Cu − rh (v) ≤ C (u − v + v − rh (v)) ≤ 2C,
OLE
,R ,
ÉC
' $
N H EC
""
E U IQ
$A $ $ 6 ,50 ,/1)*'0 5*) .330,>'9.1',* *59%0';5) &) -. :,-51',* )>.+1) &5 30,/-?9) 2.0'.1',**)- $C 6H '- =.51 '*10,&5'0) 5* ):3.+) Vh &) &'9)*:',*
T Y POL
@*') 35': 0%:,5&0) 5* :'93-) :B:1?9) -'*%.'0) .::,+'% E -!.330,>'9.1',* 2.0'.1',**)--) '*1)0*) $C6 / A Vh , . 8
LE O ÉC
, J
. , rh V Vh 6 8 ;$"< ;R # V 8 '9.-) &): 9.'--): 5# 0 Vh 8 -,+.-':% ' J , A h → 0A , Vh L M , V A , A Kh # ;$< +0)5:)A ,6 ?6 : ; G )0+'+) CC G % P1
−u = f ]0, 1[ u(0) = α, u(1) = β,
T Y POL
6% %* :
LE O ÉC
>)0+'+) CC > a(x) = 0 Ω " : % P1 * " $ :
1
f (x) dx = α − β,
0
E U IQ
$ 0 )0+'+) CC G % E 0% 2 6% & $ % $ ( : + B Kh + M bh E "B >
ÉC
E L O
T Y POL
>)0+'+) CC (n + 2) *
xj = j/(n + 1) 0 ≤ j ≤ n + 1 B k > 0 + % * fj 6 $%: % * $ * : $
L %% $ : $
' $ #
* . ) P1 6 , . 6 $ / ) ,0 ,3%0.1)50 &!'*1)03,-.1',* rh ; $)0+'+) CC ) (bi )1≤i≤I $ N K (ωi )1≤i≤I ) ψ(x) dx ≈ Volume(K) K
I
ωi ψ(bi )
i=1
ψ ∈ Pk " ( * ψ (
1 Volume(K)
4 h K
ψ(x) dx = K
LE O ÉC
I
Y L O P i=1
H C E T
ωi ψ(bi ) + O(hk+1 ),
N
E U IQ
' ! N ≥ 2 1
T Y L 8
O P LE O ÉC
4
N H EC 5
9
2
E U IQ
-
6
7
3
$ W 9
>)0+'+) CC Ω =] − 1, +1[2 7*
0 * Kh P1 > : *
>)0+'+) CC G % P1 6%
Ω =]0, 1[2 * * 7* 2 " * Kh B $ % E + h2 ( bh E
ÉC
E L O $
T Y POL
N H EC
E U IQ
W 7 8 ,
>)0+'+) CC $' ; n * B B % @* *A * * " * Kh P1 $ n2 * $ 2n n * " B % B : * Ω =]0, 1[3 + $ n3 * $ 2n2 4 n * $ B Ω
H C E T
N
E U IQ
)9.0;5) CC ' , ,9 $
Y L O P
0 ; 8O . 8 0< D Kh A ,6?6 , ' ;. A
LE O ÉC
' !
-
N H EC
E U IQ
A )0+'+) CC $ B = (bij )1≤i,j≤n "
( i(
n
LE O ÉC bii > 0,
k=1
Y L O P
bik > 0,
bij ≤ 0 ∀ j = i.
' ! N ≥ 2
N H EC
-"
E U IQ
" " M
T Y POL
>)0+'+) CC N = 2 ) uh % 6% % P1 * * Ki ∈ Th * + π/2 " uh (x) ≥ 0 Ω f (x) ≥ 0 Ω L I ( > 0( Kh + Id " ( 4 Kh *
LE O ÉC
ÉC
E L O
T Y POL
$ W 5 f
N H EC
E U IQ
, ;$$)0+'+) CC " * Kh
% Pk E $' !22 :
T Y POL
>)0+'+) CC $ !&; % $ : O N = 2 - * * Th $
LE O ÉC
Vh = v ∈ C 1 (Ω) v |Ki ∈ P5 Ki ∈ Th .
" :9 p ∈ P5 * K 2 v(aj ), ∇v(aj ), ∇∇v(aj ),
∂p(bj ) ∂n
;$-
0 $ " 0 Ω, $ " 0" $ " 9.'--.(): 0%(5-')0:
, " h = maxK ∈T diam(Ki ) "$ - ' , &" $ $"$" C " ' ) " " h > 0 " " " K ∈ Th ' i
h
diam(K) ≤ C. ρ(K)
Y L O P
H C E T
N
E U IQ ;$
0 ; 8 h< K ∈ Th 8
LE O ÉC
' ! N ≥ 2
T Y POL
N H EC
-
E U IQ
diam(K)
LE O ÉC
ρ(Κ)
$& W 1 diam(K) ρ(K) , K ;$< ,# . . . •
E U IQ
/ . 6 : . ) Pk . .
N H C 0 , "
$ " T E 0 " ' "$ )/+ 8#" " ' $ ) Y %,3%' L )&"$ $"$ %,9 )O "# $" *$ , "# P " $" *$ $-0' E L O C É 8 ) ' " ' $ ""$ 4%,0?9) CC H01 (Ω)
(Th )h>0
Ω
uh ∈ V0h Pk
Pk
;$"
N/2
;$"
N/2 * $$ N/2 1
E U IQ
rK H k+1 (K) H k+1(K) C(K) v ∈ H k+1 (K) v − rK vH (K) ≤ C(K)|v|H N/G! (K) ,
% |v|H (K) ! 1 ! & k+1
k+1
|v|2H k+1 (K)
=
LE O ÉC |α|=k+1
K
Y L O P
H C E T
k+1
|∂ α v|2 dx = v2H k+1 (K) − v2H k (K) .
N
' ! N ≥ 2
E U D( #C/ " I" Q % * '
* N H < " C T E " % - $ " Y . OL N/)! P E
% ;& * M % L O #/! ! 6 " É C H k+1 (K) ⊂ C(K)
k +1 > N/2
H k+1 (K)
rK v v ∈ H k+1 (K)
rK
H m (K)
H
k+1
(K)
m∈N
vH k+1 (K) ≤ C(K) |v|H k+1 (K) + rK vH k+1 (K) ,
vn ∈ H k+1 (K)
N/I! ( N/I! " " vn ' H k+1(K) D( A( #C vn " % H k (K) N/I! " " % ∂ α vn |α| = k + 1 % % E L2 (K) " vn % H k+1 (K) % v " % & N/I!! |v|H (K) = 0, rK vH (K) = 0. NN ! NN ! " v ∈ Pk K #/! N/N! rK rK v = v v ∈ Pk NN ! " rK v = v = 0 " % ( N/I! ' N/G! " N/)! & (v − rK v) " " rK (v − rK v) = 0 " |v − rK v|H (K) = |v|H (K) " % k + 1 < Pk %
NCI @ 'B' " N/G! K $
% 1 = vn H k+1 (K) > n |vn |H k+1 (K) + rK vn H k+1 (K) .
k+1
ÉC
E L O
N H EC k+1
T Y POL
k+1
E U IQ
k+1
# $ k + 1 > N/2 diam(K) ≤ 1 : K v ∈ H (K) k+1
C
v − rK vH 1 (K) ≤ C
(diam(K))k+1 |v|H k+1 (K) . ρ(K)
NN!
$ A " NC " " N K * N * K0 N#N!
%' B % b K ! " x ∈ K x0 ∈ K0 % x = Bx0 + b. NN! ' NN! N/G! ' K0 " (
%' NN! 5 % % & K 4 "
' FC/H! 7 '
( %' det(B) % K ' & %
LE O ÉC
Y L O P
H C E T
N
E U IQ
' !
E U % I Q " * % N H C E T Y OL $ N/G! P LE O ÉC −1
K0
B v(x)
|v0 |H l (K0 ) |v|H l (K)
≤ ≤
C v0 (x0 ) = v(Bx0 + b)
K
CBl | det(B)|−1/2 |v|H l (K) CB −1 l | det(B)|1/2 |v0 |H l (K0 ) .
|v − rK v|H 1 (K) v − rK vL2 (K)
≤ ≤
CBk+1 B −1 |v|H k+1 (K) CBk+1 |v|H k+1 (K) .
% * " B ≤
diam(K) , ρ(K0 )
B −1 ≤
diam(K0 ) . ρ(K)
0 ' ' NN!
' # v ∈ H
E U IQ k+1
rh v N K rK v " v − rh v2H 1 (Ω) =
N H EC
v − rKi v2H 1 (Ki ) .
T Y POL Ki ∈Th
(Ω)
$ " ; NN! & (" Ki % C !
N#I! ; * diam(Ki )/ρ(Ki ) $
ÉC
E L O
v − rh v2H 1 (Ω) ≤ Ch2k
|v|2H k+1 (Ki ) ≤ Ch2k v2H k+1 (Ω)
Ki ∈Th
"
>)0+'+) CC " * *( P1 ( $ $ rh N = 2 3 v − rh vL2 (Ω) ≤ Ch2 vH 2 (Ω) .
(
E U IQ
Ω # ;,6?6 Ω . 6 # 8 N/2' $ ""$
Y L O " $ $"$" $ )$ $"P " , E L O ÉC
u − uh H 1 (Ω) ≤ Chk uH k+1 (Ω) ,
. C
h
u
E U IQ
' ! N ≥ 2
E U # " $ I Q
* N $
H 'C
! $ % " E * & " ' T ' $ Y L ( ' !$ O ' (" P E " * " ! K ( L % A " NC) & ;! O C
* % É " " " & * ! % & FC/H Qk
N
[0, 1]N 2N
F N
2
Ω F (Qk ) F (Qk ) = Qk
N
Qk
N
Q1
N =2
•
# ! $ Ω N
N ( Pk Qk • % & FC/H
E U IQ
##$ $ Pk Qk N = 3 8 " k9 1 " Ω = ω×]0, L[ % ω % R2 $ ω Ti ]0, L[ [zj , zj+1 ] $ R3
Ti × [zj , zj+1 ] % " Ω $ * ' Pk Qk % & FC/H •
T Y O L ( P E L ÉCO
N H EC
) ? # , . ; # , < 0 ' , # % ;"&< ? , 0 D ; . . $ "$ (Uh , Ph ) $ -" Uh " $ ' "$ Ph " $ "$ )+ $ $" KerBh∗ ,
)99) CC RnV × RnQ ,
E U IQ
%9,*:10.1',*C ' ( KerBh )⊥ = ImBh∗ A 8 . ;$&<
. ?
H C E T
N
. Uh ∈ KerBh Ah Uh · Wh = bh · Wh Wh ∈ KerBh .
Y L O P
: , 5 67 0 , , Uh KerBh * A ;$&< (Uh , Ph ) RnV × RnQ ' Uh ? KerBh A
LE O ÉC
' !
N H EC
E U IQ
R * A . ) Ph ? , , KerBh∗ nV
T Y POL
? R A , # KerBh∗ , I
. , 8 H L M 5 8 k k ) .
E $! L O É C )$" $" 0
)99) CC
$"$" $ -" 1I Rn $" " "
"$" "' )$ +" ph " $
KerBh∗ 1,
Q
*$ $ $"$" )+,
%9,*:10.1',*C rh ∈ Qh wh ∈ V0h * ) Wh · Bh∗ Rh = Bh Wh · Rh =
rh divwh dx. Ω
@ rh = 1 I ? Qh A divwh dx = wh · n ds = 0 Ω
∂Ω
T Y L
N H EC
E U IQ
wh ∈ V0h A Rh = 1I = (1, ..., 1) ? KerBh∗
PO 0
ÉC
E L O
-1
+1
0
-1
+1
0
-1
+1
0
-1
+1
0
-1
+1
0
$ W 7 0 8 ;6 ) P1 . $" D$ - $ >$"' " A∗ = A,
%@*'1',* CC A
E U IQ
Y L O P
" A $ ))"$ $ $"$ V $ V , $ " A " *$ )"- Ax, x > 0 ) " " x ∈ V $$ $ ,
%@*'1',* CC
LE O ÉC
( $
N H EC
E U IQ
@ , ) 6 I 0 0 / . , ) 6 I +,93.+1): ) ,
LE O ÉC
T Y POL
:$ $/ K ⊂ V " " )" ' " " " (un )n≥1 $" K ' $ ) " &" $ " un $-0$" $ K , :$ $/ K ⊂ V " " "-$" )" ' " " " (un )n≥1 $" K ' $ ) " &" $ " un $-0$" $ V ,
%@*'1',* CC
0 A V ) A 60 V 8 0 7 A , . ) 9 (A 60 I 8 0 , . .
E U IQ
)99) CC 8$ $ ) @/" V $$ $*$' / $" $" > )",
N H EC
%9,*:10.1',*C ' , ) A
T Y POL
46 ) (en )n≥1 ' 6 0 ? 0 8 * A n = p
E L O
en − ep 2 = en 2 + ep 2 − 2en , ep = 2,
C " " & ) @/" " $ ))"$ $ É $"$ $ , $ " " )" 0 ) / $" . , 6 en , ' #
%@*'1',* CC V
V
W
W
A
A
V " "-$" )" $ W ,
A
1 .A A A 0 xn V A 6 Axn . W W V ) A ' , . W V ) A , .
E U IQ
>)0+'+) CC " $ Id O V $ 5 &2
H C E T
N
>)0+'+) CC ) $ O 2 x = (xi )i≥1
i≥1 |xi | < +∞( x, y = i≥1 xi yi ) (ai )i≥1 ( |ai | ≤ C < +∞ i ≥ 1 $ A Ax = (ai xi )i≥1 A " A limi→+∞ ai = 0 2
LE O ÉC
Y L O P
(
N H EC
"
E U IQ
>)0+'+) CC ) U ( V W O ( A
V W ( B U V " $ AB A B ' $ $ 5 $
T Y POL
*
# E L O
ÉC
6 .
4%,0?9) CC " V $ ) @/" $$ $*$ " A $ ))"$ $ $"$ ' *$ )"-' " >$"' )" V $ V , - )) A $" $ " (λk )k≥1 ""$" )" "$ - ' " &" $ / #/"$$ (uk )k≥1 V -" )) A' - Auk = λk uk ) k ≥ 1.
E U IQ
)9.0;5) CC ' 5 & -A . H 6 A 0 &%+,93,:'1',* :3)+10.-) v ∈ V v=
+∞ k=1
E L O
T Y POL
v, uk uk .
N H EC
v = 2
+∞
|v, uk |2 .
k=1
•
>)0+'+) CC %: % 0 ν > 0 |a(w, v)| ≤ M wV vV w, v ∈ V
a(v, v) ≥ νv2V v ∈ V.
* . A . A ? . = 0 H / 8 ,# 8 .
V ⊂ H . I ;&< V H.
T Y POL
N H EC
E U IQ
, L I M . , , I ? v ∈ V Iv = v ∈ H ;. 1) & &"$ )" " V " $ $ H , " a(·, ·) $ /$ !" $"$ " - V , - )) F, $" $ " $" (λk )k≥1 )" "$ - $*$' " &" $ / #/"$$ H (uk )k≥1 -" )) ' " uk ∈ V, " a(uk , v) = λk uk , vH ∀ v ∈ V. √ 8 ) ' (uk / λk )k≥1 " $ / #/"$$ V ) ) " a(·, ·),
N H EC
E U IQ
%9,*:10.1',*C * f ∈ H A . 0 .
. u ∈ V a(u, v) = f, vH 8 v ∈ V.
T Y POL
;&
0 a(v, v) +
ηv2H
≥
νv2V
v ∈ V.
H C E T
N
E U IQ
6 (λk )k≥1 ( λk + η > 0
Y L O P
/ . 6 0 . ;& )0+'+) CC Ω =]0, L1 [×]0, L2[× · · · ×]0, LN [( 4
H C E T
(Li > 0)1≤i≤N 0 6% &&
Y L O P
5 &" , / .
LE O ÉC
( $
N H EC
E U $" $"+ IQ
∂Ω " Ω $ -" /$ 0 R ) $ & )" >$" 0 + ∂ΩN " ∂ΩD - )0+'+) CC %: % 0 ∇u ; H u− = min(u, 0) 0 Ω @ ? u+ u− ; ? * &< . H A , 6 ? λ1 @ # . 8 u1 u2 A ,6?6 u1 u2 dx = 0, Ω
N H C E
E U IQ
0 , A
T Y L PO
>)0+'+) CC ) Ω * " Ω > $
LE O ÉC
( $
$
N H EC
E U IQ
)9.0;5) CC ,0 6 : A ,6?6 0 . .
−div(A∇u) = λu Ω u=0 ∂Ω
LE O ÉC
T Y POL
R A(x) # . ;. 6 " 0 2µ + N λ > 0 9 ,0 8 f ; ,. < ;&-< ,. , 6 & ' ? (, u) 0 . .
−div (2µe(u) + λ tr(e(u)) Id) = u Ω ;&< u=0 ∂Ω,
ÉC
E L O
R = ω 2 8 . 0 ; . . . 8 . : λ 2 &
N H EC
' $ #
T Y POL
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Ω
f v dx .
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∈ L2 (Ω)N
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E U IQ
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0
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2
N
! y(t) ∈ H (]0, T [; R ) [0, T ] 5 ' f v 6 L2 $ * t 1
ÉC
E L O
N
T Y POL
exp (t − s)A (Bv + f )(s) ds
y(t) = exp(tA)y0 +
0
" % y H 1 (]0, T [; RN )
#CC " y [0, T ] $
' $ : u ∈ L (]0, T [; K) ! ! C# - !1 2
! ! u
T
Q(yu − z) · (yv − yu )dt 0
T
Ru · (v − u)dt
+ 0
+D(yu (T ) − zT ) · (yv (T ) − yu (T )) ≥ 0 ,
GC!
E U IQ
v ∈ L2 (]0, T [; K) % yv C !! v $
" " v → y * 0 + G! yv = y˜v + yˆ : y˜v Y L O P
d˜ yv = A˜ yv + Bv dt y˜v (0) = 0
LE O ÉC
H C E T
0≤t≤T
N
G#!
- # %
yˆ
N H EC
dˆ y = Aˆ y+f dt yˆ(0) = y0
T Y POL
0 ≤ t ≤ T
E U IQ
6 " yˆ v v → y˜v L2 (]0, T [; K) H 1 (]0, T [; RN ) " v → J(v) * " " % v
* " " * ! J % * % R % 5
L2 (]0, T [; K)
% * % D( IN & &
u G! . D( J (u), v − u ≥ 0 ( -
LE O ÉC
lim
→0
J(u + w) − J(u) = J (u), w.
5
J(v) " " " yu+w = yu + ˜yw $ ' GC! " " yu − yv = y˜u − y˜v
E U Q! " I
N
(
" % 1 /! $ '
H C E T Y G/! L O P E : * L " " O C É GC! * ' S 0 $ 0 G! * J (w)
w ∈ L2 ]0, T [
T
J (w)v dt
0
u
T
T
Rw · v dt +
=
0
+D(yw (T ) − zT ) ·
Q(yw − z) · y˜v dt
0 y˜v (T )
,
L2 ]0, T [
v
•
+ u (" * v yv , *2 % ' '
J (u) & G/! & 6 " * (
"$ $-0 " ' " CO ,, E *$ ) ,% $-0 - T "$ Y L O P LE O ÉC 4%,0?9) CC
J
V
J
α
C
0 < µ < 2α/C u0 ∈ K
2
(un )
u
%9,*:10.1',*C 5 " 0. . ;< , v → v − µJ (v) 0 < µ < 2α/C 2 A ,6?6 ∃ γ ∈]0, 1[ , v − µJ (v) − w − µJ (w) ≤ γv − w .
* I PK 8 0 , ; )0+'+) CC ' %: % - ;!;(
J F1 , . . . , FM , E I(u) $ u( u 6 ;2 '( Fi (u) i∈I(u) ( M $ * * λ1 , . . . , λM J (u) + i=1 λi Fi (u) = 0( λi = 0 i ∈ / I(u) " ( i ∈ {1, . . . , M }
LE O ÉC
T Y POL &
lim
ε→0
' 2 max (Fi (uε ), 0) = λi . ε
)9.0;5) CC
/ . ? 6 8 L0 M •
@
5 % B
E U IQ
@ ) V = RN 9 /C F 8 C 2 RN RN u F F ,6?6
N H EC
F (u) = 0 F (u) . 0
T Y POL
8 5# . v
F (u) = F (v) + F (v)(u − v) + O u − v2 ,
ÉC
,6?6
E L O
u = v − (F (v))
−1
F (v) + O v − u2 .
/C ? 8O . 6
* u0 ∈ RN A un+1 = un − (F (un ))
−1
F (un ) n ≥ 0.
; "
0
u
u
; &
0 " (x + y) ∈ Xad (x − y) ∈ Xad * " x = (x + y)/2 + (x − y)/2 x x '"
N H EC
E U IQ
8 . , : # Xad
T Y POL
&" $ "$ )" )0 $ "$ ,' &" $ "$ )" / , 0,3,:'1',*
CC
E L O
%9,*:10.1',*C ? "
ÉC
x ∈ Xad ;)0+'+)
E L O
CC " $ % A m× n b ∈ Rm R Xad [0, 1]n−m M n − m Ax = b ' Xad
2n−m
ÉC
. )
, G ? 4 1F ? # 0 I ,? , .
; ( .
0, :$ $ "$ $ " 6$" ) "" "$ / B " )" " c˜N = cN − N ∗ (B −1 )∗ cB ≥ 0.
-" c˜N " )) 2)+1)50 &): +,M1: 0%&5'1:,
;&
&5 +4.*()9)*1 &) /.:)
T Y POL
N H EC
E U IQ
, # . G c˜kN .A 8 8 , * 0A
.
LE O ÉC *'1'.-':.1',*
' . 0 0 , K ;+6 , 0 xB = B −1 b ≥ 0 , . < P ? 0 * A 0 ;< m . 0 ,A − Idm 0 L 0M , ;)0+'+)
x1 + 2x2
⎧ ⎨ −3x1 + 2x2 + x3 = 2 −x1 + 2x2 + x4 = 4 ⎩ x1 + x2 + x5 = 5
CC C $ * % * min
x1 ≥0, x2 ≥0
2x1 − x2
H C E T
N
E U IQ
x1 + x2 ≤ 1 x2 − x1 ≤ 1/2 $ $ $
>)0+'+)
Y L O P
CC C $ * % *
LE O ÉC
min
x1 ≥0, x2 ≥0, x3 ≥0, x4 ≥0
3x3 − x4
$
N H EC
x1 − 3x3 + 3x4 = 6 x2 − 8x3 + 4x4 = 4
T Y POL
E U IQ
.
LE O ÉC
1 . B B% 0 -A . , A A , . , ; A A 0 # Xad < . ? , Xad I 0 ,? . / , 6 .-(,0'149) &) 10.)0+'+) CC " ' Z + , ( $' >)0+'+) CC C $ E ( $' /2 5 n * R n ( ( aij % (i, j)( %% σ ∈ Sn ( max
aiσ(i) .
C E T Y L PO
σ∈Sn
1≤i≤n
HN
E U IQ ;&
* % φ [ i * %( % i + [ j φj = +∞ * % $ , * φ( $ V ! ( * + v - ( v ∈ RN $ V ! $
C = {i ∈ N | φi ≥
min
$ % % i ∈ C [ π(i)
O P E L ÉCO
HN
(ci,k +
C E T LY k∈N , (i,k)∈A
vk )}
,
E U IQ
vi = ci,π(i ) + vπ(i) .
π : C → N " i ∈ C ( k k πk (i)( $ + C 0 v ≥ v @ ;"< ) v = f (v)A . 6 ) . f : RN → RN 3 5
66 v ? , , ) * ? . )A . ? A ,# . 8 X ? , @ ( RN , A ) A A , 6 f : x → f (x) * f (φ) ≤ φA f r+1 (φ) ≤ f r (φ)A r ≥ 0 {f r (φ)}r≥0 P . . . v ∈ RN ; , . −∞ : v A . < @ f (v ) = v f 1, A v ) f A . 6 v ≤ φA f A v = f r (v ) ≤ f r (φ)A r ≥ 0A , ) r ≥ 0A v ≤ v A v ) f * , 5 A 8 . 6) f A . .
H C E T
Y " L O $"$ - *$ ) ,=, P E L O ÉC 4%,0?9)
CC $1%0.1',* :50 -): 2.-)50:6 v
N
{f r (φ)}r≥0
E U IQ
T" -
-
E U
I Q " % ( & & N
H " " " " C ! & " " % E T ! Y * '
L '.dA \ '%A 8 $" B"#,A 9 . '7 -A 6 $"6$"$A ? )0+'+) CC - * * + !2( $ + $' !
>)0+'+) CC @ A : * + * % G = (N , A)( $ t : A → R+ ( + %% % [ * *( % λ * *( D(λ) + $ E ' O N ( : * >)0+'+)
T Y POL
N H EC
E U IQ
CC > &;( 4 Ji
E L O
Rn R $ +∞ $ $ ( $ 0% ;( + > C &; " C ⊂ ∂J(x) 2 0 ∈ ∂J(x) ' *
ÉC
min
t
y ∈ Rn , t ∈ R, Ji (y) ≤ t, ∀i ∈ I ,
0 ∈ C 0 * ( C = ∂J(x)
@ " '; " " " 0 , ( ! ! ' * < ! $ " ' ( ' < * ' " 8'9 " 0 #C
" ' & % ( - Y & ( , '
( ( " 1 C ! , ' ' " ' ' 6 4 6 %
' 4 % "
LE O ÉC
Y L O P
H C E T
N
E U IQ
E U ' 5 B & I Q " % ("
( * N ' 4 % C H " " % %E % B T ' % (" E
! , ' ' 1 " & Y 4 L " O @ , ' 9' 3 " ' 4 " " P % ' ' LE 4 O ' 9' ' & C * 4 4 K ' ( - & 5 3 É % 1 5 B ' 4 $
" ' 4 " % 4 % B -
& %
-
' 4 M ' & 0 #/ ' ( % 0 #N 4 $ " ' 4 %' " ' < K " & " = 4 ' % ' " - ! ? A O . 1 7 ( J IGI " - ! ! 5 B Z • II/
T Y POL
N H EC
E U IQ
( & A$ ( " ' " ; ' ' " % " ( % & * + K ( (" " % FCH! ' % F/H , ( % ( " " & % ' 1 " " ' ( " " % %
. ( " (( '
" % % % &
' , (" + " % ' !
5 "
& " ' " •
ÉC
E L O
LE O ÉC
Y L O P
H C E T
N
E U IQ
N H EC
E U IQ
#442': : '2: 2:4#2: !2 ; ' 0
0 ≥ −2 x − xK , y − xK + θz2 .
0 * θ % ' ! A " xK " % y ∈ K x − y2 = x − xK 2 + xK − y2 + 2 x − xK , xK − y ≥ x − xK 2 ,
" % " xK ' ; ( x K
C E T Y L PO
HN
E U IQ
" V $ ) @/" ) ) " , , $ ) ) / #/"$$ $// V $ $// (en )n≥1 $" V " "#$ ) ) " " " ) -" $0$ ) "" " $ $ V , %@*'1',* C C
LE O ÉC
"
E U ) " , " " $ ) @/" ) IQ N
$ / #/"$$ , " " H $" ' &" $ $ " " )" $-0 - $ C) E "$ - $*$' " "" " " *$ , 8 ) ' $ T Y L O P E $O "L ÉC 0,3,:'1',* C C
,
V
(en )n≥1 (xn )n≥1 p
V
x2 = x, x =
V p x n=1 xn en xn = x, en
x
;
0 y ' (en )n≥1 " x − y < OP D( Sp " & z ∈ V * Sp z = zW : zW ; ( % W p % (en )1≤n≤p 0 % ! (z − Sp z) ( & W & Sp z $ " z2 = z − Sp z2 + Sp z2 , #! " "
E L O
n )n≥1
T Y POL
N H EC
E U IQ
Sp z ≤ z∀z ∈ V.
5
Sp z (en )1≤n≤p " (z − Sp z) ( & ( (en )1≤n≤p % * "
ÉC
Sp z =
p
z, en en .
n=1
p
Sp y = y y ' (en )n≥1 " Sp x − x ≤ Sp (x − y) + y − x ≤ 2x − y ≤ 2.
$ % Sp x % x . % " #! 2 2 lim Sp x = x ,
p→+∞
" " *
C! %
H C E T
N
E U IQ
, , 0 0 00 , = 0 . :6 , , 0 0 00
Y L O P
" V $ ) @/" )/ ,, &" $ $// $ $ V , &" $ / #/"$$ $// V , 0,3,:'1',* C C
LE O ÉC
$
E U * I % 1 Q N " &
& ; H " '! O 1( & * ' C E
* ( 5
" T % L Y T % " . P O ' (' LE O " " & ) @/" , :$ ))"$ ÉC (vn )n≥1
V
vn
[v1 , · · · , vn ] = [e1 , · · · , en ]
(en )n≥1
(en )n≥1
V
(vn )n≥1
(en )n≥1
%@*'1',* C C
V
W
$ A V $ W " " $"$ &" $ $"$" C " AxW ≤ CxV
∀x ∈ V.
) )"" $"$" C -* "" $0" " $ ))"$ $ A' "$" " A =
AxW . x∈V,x=0 xV sup
N H EC
E U IQ
. . , , = 0 ; , X ,6 )6 " K $ ) " $-& $$ - " $ ) @/" V ' " x0 ∈/ K , &"
$ #!))$ V ) ""$" x0 " K ' " &" $ $ L ∈ V " α ∈ R " L(x0 ) < α < L(x)
; "
0A R ∆k 6 , k AA uii 8 @ B = LD C = D−1 U . ) A = BC ' A = A∗ A C(B ∗ )−1 = B −1 (C ∗ ) 9 . & C(B ∗ )−1 A B −1 C ∗ 8 9 1 A B C HA B −1 C ∗ , A ,6?6 C(B ∗ )−1 = B −1 C ∗ = IdA C = B ∗ * , '%#A , 8 A = B1 B1∗ = B2 B2∗ A ,R B2−1 B1 = B2∗ (B1∗ )−1 1 &A B2−1 B1 = D = diag(d1 , ..., dn )A A = B2 B2∗ = B2 (DD∗ )B2∗ ' B2 . 0A . D2 = Id di = ±1 @ : , '%# 8 # 1 di = 1A B1 = B2
LE O ÉC
Y L O P
H C E T
N
E U IQ
*
N H EC
E U IQ
.-+5- 30.1';5) &) -. =.+1,0':.1',* &) 4,-):DBC 9 A 86
'%# B ) , A = BB ∗ A = (aij )1≤i,j≤n A B = (bij )1≤i,j≤n . bij = 0 i < j * 1 ≤ i, j ≤ nA .
LE O ÉC
T Y POL aij =
n
min(i,j)
bik bjk =
k=1
bik bjk .
k=1
9 ) A ; A .
H A # < B 3 A . (j − 1) B 8 (j − 1) AA j 6 A 1 2 j j−1 2 2 ajj = (bjk ) ⇒ bjj = 3ajj − (bjk )2 ai,j =
k=1 j
k=1
bjk bi,k
⇒ bi,j =
ai,j −
j−1
k=1
k=1 bjk bi,k
bjj
E U IQ
j + 1 ≤ i ≤ n.
N H EC
@ j 6 B 8 (j − 1) 3 A G A A # ) .A 8 3 A A , 2 ) .A . ajj − j−1 (b ) ≤ 0 j A k=1 jk H ,
E L O
T Y POL
-(,0'149) *59%0';5)C , '%# , 8O 6
ÉC
0 A ? 8 B + , : % 8 A A #
( j = 1, n ( k = 1, j − 1
ajj = ajj − (bjk )2 + k √ ajj = ajj ( i = j + 1, n ( k = 1, j − 1 aij = aij − bjk bik
+ k aij =
aij ajj
+ i + j
Y L O P
H C E T
N
E U IQ
,931) &!,3%0.1',*:C * ,: '%#
LE O ÉC
0 , ; < ? 6
*
N H EC
E U IQ
0 n 0 , W 2 '%# J 0 , Nop
ÉC
OLE
T Y POL Nop =
n
⎛
⎝(j − 1) +
j=1
n
⎞
j⎠ ,
i=j+1
A A Nop ≈ n3 /6
0 J 8 ( # ? B B ∗ 0 , Nop ≈ n2 '%# . &)5> =,': 3-5: 0.3'&) 4 # ) . W
.10'+): /.*&): )1 9.10'+): +0)5:):
N H EC
E U IQ
, 0 : A , +0)5:) ? A /.*&) * # ; ) &5 2)+1)50 '*'1'.- x0 ∈ Rn ' " "$ ))# xk
$-0 - "$ &" x,
H C E T
N
E U IQ
@ : . , . ? , # , ;. 1) " # 0 (M ∗ + N ) % w = 0 A M %' . −1 2 ∗ M
N = 1 − (M + N )w, w < 1,
N
E U IQ
" " ( % &
( % " % ( * % % * J (
%
LE O ÉC
Y L O P
H C E T
*
E U # " " ! ; & I Q " !! N H %
! 7 C ! $ 1 ?
6 9 A ωopt # , M −1 N A . .
ÉC
E L O
>)0+'+) C C ) A % " ω ∈ ]0, 2[( % *
>)0+'+) C C " ( % ( 5 ρ(M −1 N ) ≥ |1 − ω| , ∀ω = 0,
$ * 0 < ω < 2
E U IQ
" $ )+" α = 0, $ )) "# 0 $" "# ""- )"$
%@*'1',* C C $9%14,&) &5 (0.&')*16 M=
1 Id α
"
N=
1 Id − A . α
Y L O P
H C E T
N
0 . 6 A 8 f (x) = 12 Ax · x − b · x 0
LE O ÉC
*
)99) C C ... ≤ λn ,
E U )) " $ " 0$/ - I$Q$-0 N ' "# H 0 $" ) $ ' C "# 0 $" $-0 " E )"' $ ' " )+" ' " T Y P O L "
LE O ÉC
λ1 ≤ λ2 ≤
A
λ1 ≤ 0 ≤ λn - α, 0 < λ1 ≤ $" 0 < α < 2/λn αopt =
... ≤ λn
ρ(M −1 N )
α
2 λ1 + λn
min ρ(M −1 N ) = α
λn − λ1 . λn + λ1
)9.0;5) C C λ1 ≤ ... ≤ λn < 0A #
) 8 α −α * αopt A # , 8 λn /λ1 A I A , cond2 (A) A * A A 0 A . •
E U IQ
%9,*:10.1',*C 1, $A . ρ(M −1 N ) < 1 @ M −1 N = ( Id − αA)A
N H EC
ρ(M −1 N ) < 1 ⇔ |1 − αλi | < 1 ⇔ −1 < 1 − αλi < 1 , ∀i.
T Y POL
' αλi > 0 1 ≤ i ≤ n * . A . H H α . λ1 ≤ 0 ≤ λn A α A A 0 < λ1 ≤ ... ≤ λn A , 8 0 < α < 2/λn * αopt A 8 λ → |1 − αλ| ] − ∞, 1/α] [1/α, +∞[A
ÉC
E L O
ρ(M −1 N ) = max{|1 − αλ1 |, |1 − αλn |}.
* A 8 α → ρ(M −1 N ) , 6 2 αopt = λ1 +λ n
5 I I
. # # ) . , , ; 0 . A . 1) 0 " *$' ) E C ' ) T "Y L O P $ $ -" $$ ) 3,, 8 ) ' "" " " ' &" /$ E "# $-0L - "$ !"+ $ $' ) ' ""$, O ÉC
)99) C C
A x0 ∈ Rn r0 = b − Ax0
(Kk )k≥0
xk ∈ [x0 + Kk−1 ]
n r0
k≥1
;
)0+'+) C C ) A : ) (xk )0≤k≤n
T Y POL
% % * 5* rk = b − Axk dk = xk+1 − xk " $ N: Kk * +
ÉC
E L O
Kk = [r0 , ..., rk ] = [d0 , ..., dk ],
(rk )0≤k≤n−1 %* rk · rl = 0 0 ≤ l < k ≤ n − 1,
(dk )0≤k≤n−1 5* + A Adk · dl = 0 0 ≤ l < k ≤ n − 1.
) , . I
9 (A , , rk ? Kk−1 A xk . 8 .
HN
E U IQ
" A $ " !" *$ )"-' " x0 " (xk , rk , pk ) " " *$ ) "$ $
0,3,:'1',* C C
C E T Y L " ) O P E OL
p0 = r0 = b − Ax0 ,
ÉC
⎧ ⎨ xk+1 = xk + αk pk 0≤k rk+1 = rk − αk Apk ⎩ pk+1 = rk+1 + βk pk
∈ Rn ,
;
C ! . %
E L O
T Y POL
min |λi − λ| ≤ ˆ vk+1
1≤i≤m
|ek · y| , y
"
ÉC
LE O ÉC
Y L O P
H C E T
N
E U IQ
T Y POL
É
N H EC
E U IQ
$%&' LE O C
TU 3=N3 +BA 734/3/5 5A @+/ NEA "NJ + .A /C N# ;f53 >A $ )0$0A 2 'A /C Z% ;-9+ 2A 34/3 7A A/ #' B CA E ;&