Add to ORKGWe prove that the maximal development of any spherically symmetric spacetime with collisionless matter (obeying the Vlasov equation) or a massless scalar field (obeying the massless wave equation) and possessing a constant mean curvature Cauchy surface also contains a maximal Cauchy surface. Combining this with previous results establishes that the spacetime can be foliated by constant mean curvature Cauchy surfaces with the mean curvature taking on all real values, thereby showing that these spacetimes satisfy the closed-universe recollapse conjecture. A key element of the proof, of interest in itself, is a bound for the volume of any Cauchy surface in any spacetime satisfying the timelike convergence condition in terms of the volume and m...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We prove that the maximal development of any spherically symmetric spacetime with collisionless matt...
We prove theorems on existence, uniqueness and smoothness of maximal and constant mean curvature com...
We obtain new simple sufficient conditions to ensure the stability and strong stability of maximal h...
It is shown that the initial singularities in spatially compact spacetimes with spherical, plane or ...
This work investigates some global questions about cosmological space-times with two-dimensional sph...
It is shown that in a class of maximal globally hyperbolic spacetimes admitting two local Killing ve...
The main result of this paper is a proof that there are examples of spatially compact solutions of t...
Foliations by constant mean curvature hypersurfaces provide a possibility of defining a preferred ti...
We show a global existence theorem for the Einstein-matter equations of T3-Gowdy symmetric spacetime...
Spacelike hypersurfaces of prescribed mean curvature in cosmological space times are constructed as ...
We show that any homogeneous initial data set with $\Lambda<0$ on a product 3-manifold of the orthog...
This paper gives a new proof that maximal, globally hyperbolic, flat spacetimes of dimension $n\geq ...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...
We prove that the maximal development of any spherically symmetric spacetime with collisionless matt...
We prove theorems on existence, uniqueness and smoothness of maximal and constant mean curvature com...
We obtain new simple sufficient conditions to ensure the stability and strong stability of maximal h...
It is shown that the initial singularities in spatially compact spacetimes with spherical, plane or ...
This work investigates some global questions about cosmological space-times with two-dimensional sph...
It is shown that in a class of maximal globally hyperbolic spacetimes admitting two local Killing ve...
The main result of this paper is a proof that there are examples of spatially compact solutions of t...
Foliations by constant mean curvature hypersurfaces provide a possibility of defining a preferred ti...
We show a global existence theorem for the Einstein-matter equations of T3-Gowdy symmetric spacetime...
Spacelike hypersurfaces of prescribed mean curvature in cosmological space times are constructed as ...
We show that any homogeneous initial data set with $\Lambda<0$ on a product 3-manifold of the orthog...
This paper gives a new proof that maximal, globally hyperbolic, flat spacetimes of dimension $n\geq ...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We show a global existence theorem for Einstein-matter equations of $T^{3}$-Gowdy symmetric spacetim...
We study global existence problems and asymptotic behavior of higher-dimensional inhomogeneous space...