We obtain a global existence result for the Einstein equations. We show that in the maximal Cauchy development of vacuum $T^2$ symmetric initial data with nonvanishing twist constant, except for the special case of flat Kasner initial data, the area of the $T^2$ group orbits takes on all positive values. This result shows that the areal time coordinate $R$ which covers these spacetimes runs from zero to infinity, with the singularity occurring at R=0
A combination of qualitative analysis and numerical study indicates that vacuum $T^2$ symmetric spac...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We prove several global existence theorems for spacetimes with toroidal or hyperbolic symmetry with ...
We consider the Einstein equations in $\mathbb{T}^2$ symmetry, either for vacuum spacetimes or coupl...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
We prove the nonlinear stability of the asymptotic behavior of perturbations of subfamilies of Kasne...
We consider weakly regular Gowdy–symmetric spacetimes on T3 satisfying the Einstein– Euler equations...
We show a global existence theorem for the Einstein-matter equations of T3-Gowdy symmetric spacetime...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We consider spacetimes solving the Einstein non-linear scalar field equations with T2-symmetry and s...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We construct solutions to the Einstein vacuum equations in polarised translational symmetry in $3 + ...
A combination of qualitative analysis and numerical study indicates that vacuum $T^2$ symmetric spac...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We prove several global existence theorems for spacetimes with toroidal or hyperbolic symmetry with ...
We consider the Einstein equations in $\mathbb{T}^2$ symmetry, either for vacuum spacetimes or coupl...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
The global structure of solutions of the Einstein equations coupled to the Vlasov equation is invest...
We prove the nonlinear stability of the asymptotic behavior of perturbations of subfamilies of Kasne...
We consider weakly regular Gowdy–symmetric spacetimes on T3 satisfying the Einstein– Euler equations...
We show a global existence theorem for the Einstein-matter equations of T3-Gowdy symmetric spacetime...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We consider spacetimes solving the Einstein non-linear scalar field equations with T2-symmetry and s...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We construct solutions to the Einstein vacuum equations in polarised translational symmetry in $3 + ...
A combination of qualitative analysis and numerical study indicates that vacuum $T^2$ symmetric spac...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
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