Zur Unterscheidung folgende Indizes: $\rho_M$ und $\rho_\Lambda$ in (9); $\rho_{SI}$ in (17)
$\Lambda/8\pi{G}$
$\Lambda/8\pi{G}=D(z)\rho_{SI}-\rho_M$
$\Lambda/8\pi{G}=\rho_\Lambda$
$\rho_\Lambda+\rho_M=\rho_{SI}{D(z)}$ ###
$\Omega_\Lambda+Omega_\M=Omega_{SI}D(z)$
$\Omega_\Lambda+\Omega_M=\Omega_{SI}D(z)$
$8\pi{G}$
$\rho_\Lambda+\rho_M=0.2\rho_{M}{D(z)}$
$\rho_\Lambda={0.08}\rho_{M}-\rho_{M}$
$\rho_\Lambda=-0.92\rho_M$ (4)
$\Lambda=8\pi{G}\rho_\Lambda$
$D(z)=(\rho_M+\rho_\Lambda)/\rho_{SI}$
$\rho_{SI}$=0,2 $\rho_M$
D(z) = 5(1 + $\rho_\Lambda/\rho_M$)
$\Lambda=8\pi{G}(D(z)\rho_{SI}-\rho_M)$
$t_0=t_f\sqrt(1-{r_s/r})$
$(\rho+\rho_\Lambda)$
$(\rho_{LCDM}+\rho_\Lambda)$ = $\rho_D$ *D(z)
$(\rho_{LCDM}+\rho_\Lambda)$ = $\rho_D*D(z)$
$(\rho_{LCDM}+\rho_\Lambda)=\rho_D*D(z)$
$(\rho_{LCDM}+\rho_\Lambda)=\rho_D{D(z)}$