Asymptotically flat three-manifolds contain minimal planes

Abstract: Let (M, g) be an asymptotically flat 3-manifold containing no closed embedded minimal surfaces. We prove that for every point p ∈ M there exists a complete properly embedded minimal plane in M containing p.

“…In order to analyze the system determined by equations ( 7), (8), and (9), we consider the following separation of variables…”

“…On the other hand, Chodosh and Ketover [8] proved existence of many complete properly embedded minimal planes in asymptotically flat threemanifolds containing no closed embedded minimal surfaces. This was later generalized by Mazet and Rosenberg [15].…”

“…This was later generalized by Mazet and Rosenberg [15]. In the work [8], the authors apply degree theoretic methods, what makes it hard to give explicit estimates on the Morse index of such planes. In the same paper, they suggest also the naturally related search for unbounded free-boundary minimal surfaces in asymptotically flat manifolds with closed minimal boundaries, and the study of such surfaces in the exact Schwarzschild metric.…”

On free boundary minimal surfaces in the Riemannian Schwarzschild manifold

“…In order to analyze the system determined by equations ( 7), (8), and (9), we consider the following separation of variables…”

“…On the other hand, Chodosh and Ketover [8] proved existence of many complete properly embedded minimal planes in asymptotically flat threemanifolds containing no closed embedded minimal surfaces. This was later generalized by Mazet and Rosenberg [15].…”

“…This was later generalized by Mazet and Rosenberg [15]. In the work [8], the authors apply degree theoretic methods, what makes it hard to give explicit estimates on the Morse index of such planes. In the same paper, they suggest also the naturally related search for unbounded free-boundary minimal surfaces in asymptotically flat manifolds with closed minimal boundaries, and the study of such surfaces in the exact Schwarzschild metric.…”

On free boundary minimal surfaces in the Riemannian Schwarzschild manifold

“…The existence of minimal surfaces in hyperbolic 3-manifolds has been proved by Collin-Hauswirth-Mazet-Rosenberg [CHMR17], Huang-Wang [HW17] and Coskunuzer [Cos18]. In [CK18], Chodosh and Ketover proved the existence of minimal planes in asymptotically flat 3-manifolds. In [CL20], Chambers and Liokumovich proved that every complete Riemannian manifold with finite volume contains a complete minimal hypersurface with finite area.…”

The Allen-Cahn equation on the complete Riemannian manifolds of finite volume

“…For the 3-dimensional Riemannnian Schwarzschild space M 3 1 , O. Chodosh and D. Ketover [6] proposed to study the Morse index of the annuli surface Σ 0 , i.e., the maximum number of directions, tangential along ∂M , in whose the surface can be deformed in such a way that its area decreases, and also to investigate the existence of unbounded non-totally geodesic free boundary minimal surfaces. It follows from the work of A. Carlotto [3] that the Morse index of Σ 0 can not be zero.…”

Proper free-boundary minimal hypersurfaces with a rotational symmetry in the Schwarzschild space