Results 11 to 20 of about 25 (25)
Foliations by minimal surfaces and contact structures on certain closed 3‐manifolds
Let (M, g) be a closed, connected, oriented C∞ Riemannian 3‐manifold with tangentially oriented flow F. Suppose that F admits a basic transverse volume form μ and mean curvature one‐form κ which is horizontally closed. Let {X, Y} be any pair of basic vector fields, so μ(X, Y) = 1.
Richard H. Escobales Jr.
wiley +1 more source
An extension theorem for sober spaces and the Goldman topology
Goldman points of a topological space are defined in order to extend the notion of prime G‐ideals of a ring. We associate to any topological space a new topology called Goldman topology. For sober spaces, we prove an extension theorem of continuous maps.
Ezzeddine Bouacida +3 more
wiley +1 more source
Some of the next articles are maybe not open access.
Infinitesimal automorphisms and second variation of the energy for harmonic foliations
Tohoku Mathematical Journal, 1982Franz W Kamber, Philippe Tondeur
exaly
Virtually geometrically finite mapping class groups of 3-manifolds
Journal of Differential Geometry, 1991Darryl Mccullough
exaly

