THÈSE Nicolas VASSET
THÈSE Nicolas VASSET THÈSE Nicolas VASSET
R = r + M 2 − a2 + M, 4r R r ψ Σ0(γij, Kij) M JK ˜γijKerr(JK) λ ω(JK, MKerr, λ) = ωBY (JK) − λωcorr(JK, MKerr), λ MKerr JK r = rH [γij(λ, JK), Kij(λ, JK)] JK λ λ = 1 λ = 0 ˜γij JK λ ˜γij r = rH r = rH
H r = rH Ω NH JK MADM ˜γ ij = f ij + h ij Dih ij = 0 (˜γij) = 1. AKerr(NH, Ω) ˜ BKerr(NH, Ω) h ij χ Aχ(NH, Ω) = χA(NH, Ω) ˜ Bχ(NH, Ω) = χ ˜ B(NH, Ω). χ h ij χ (Aχ, ˜ Bχ) hχ h ij χ Aχ ˜ Bχ (µχ, ηχ, h rr χ ) h ij χ Aχ ˜ Bχ h ij χ (NH, Ω, χ) h ij χ ˜γ ij (NH, Ω) χ = 1 χ = 0 NH Ω
- Page 94 and 95: X i ψ
- Page 96 and 97: Σ (
- Page 98 and 99: θ (l) µ = 1 16π ζ
- Page 100 and 101: (M, gµν) S 2 × R l µ
- Page 102 and 103: 2π µ ∂
- Page 104 and 105: St θ (l) = 0 θ (k) < 0.
- Page 106 and 107: ¯κ
- Page 108 and 109: (Σt, γij, Kij)
- Page 110 and 111: ψ
- Page 112 and 113: ψ
- Page 114 and 115: ˜γij = ψ −4 γij; ψ = 1 (γ
- Page 116 and 117: h ij h ij D
- Page 118 and 119: h ij
- Page 120 and 121: A ∆A − ψ4 N 2 LβLβA = A
- Page 122 and 123: ∆h µ + 2 ∂h r µ ∂r ∆h η
- Page 124 and 125: h ij h ij
- Page 126 and 127: MHΩ JK a M
- Page 128 and 129: MH JH MADM
- Page 130 and 131: 1 − ɛA M2 M 3
- Page 132 and 133: ˜γ ij
- Page 134 and 135: h ij A ˜ B
- Page 136 and 137: H IJ A ˜ B
- Page 138 and 139: AHE = 8π(M 2 ADM + M 4 ADM − J
- Page 140 and 141: MHawking(S2) ≥ MHawking(S1) S2
- Page 142 and 143: ɛ P := A 16πM 2 ADM ɛ A := ≤ 1
- Page 146 and 147: H (1−ɛA) r
- Page 148 and 149: ɛA ɛP A JK λ
- Page 150 and 151: (1 − ɛA) NH = 0.5
- Page 152 and 153: ɛP A NH = 0.55
- Page 154 and 155: Σt St
- Page 156 and 157: (b − N) (b − N) = −Cθ
- Page 158 and 159: t0
- Page 160 and 161: S t = t0
- Page 162 and 163: αN = 1000 µN = 1
- Page 164 and 165: ψ 2 α (b−N) = 1000 µ (
- Page 166 and 167: ψ 2 α (b−N) = 1000 µ (
- Page 168 and 169: ψ 2 α (b−N) = 1000 µ (
- Page 170 and 171: ψ 2 α (b−N) = 1000 µ (
- Page 172 and 173: ψ 2 α (b−N) = 1000 µ (
- Page 174 and 175: ψ 2 α (b−N) = 1000 µ (
- Page 176: ψ 2 α (b−N) = 1000 µ (
R = r + M 2 − a2 + M, <br />
4r<br />
R r <br />
ψ <br />
<br />
Σ0(γij, Kij) M <br />
JK <br />
<br />
˜γijKerr(JK) <br />
λ <br />
ω(JK, MKerr, λ) = ωBY (JK) − λωcorr(JK, MKerr), <br />
λ <br />
MKerr <br />
JK r = rH <br />
[γij(λ, JK), Kij(λ, JK)] <br />
JK λ λ =<br />
1 λ = 0 <br />
<br />
˜γij <br />
JK λ <br />
<br />
˜γij <br />
<br />
<br />
<br />
<br />
<br />
<br />
r = rH<br />
<br />
<br />
<br />
<br />
r = rH